TSTP Solution File: CSR153^2 by cocATP---0.2.0
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- Process Solution
%------------------------------------------------------------------------------
% File : cocATP---0.2.0
% Problem : CSR153^2 : TPTP v6.1.0. Released v4.1.0.
% Transfm : none
% Format : tptp:raw
% Command : python CASC.py /export/starexec/sandbox/benchmark/theBenchmark.p
% Computer : n117.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 2.6.32-431.20.3.el6.x86_64
% CPULimit : 300s
% DateTime : Thu Jul 17 13:21:09 EDT 2014
% Result : Timeout 300.04s
% Output : None
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----NO SOLUTION OUTPUT BY SYSTEM
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% % Problem : CSR153^2 : TPTP v6.1.0. Released v4.1.0.
% % Command : python CASC.py /export/starexec/sandbox/benchmark/theBenchmark.p
% % Computer : n117.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 2.6.32-431.20.3.el6.x86_64
% % CPULimit : 300
% % DateTime : Thu Jul 17 10:11:46 CDT 2014
% % CPUTime : 300.04
% Python 2.7.5
% Using paths ['/home/cristobal/cocATP/CASC/TPTP/', '/export/starexec/sandbox/benchmark/', '/export/starexec/sandbox/benchmark/']
% FOF formula (<kernel.Constant object at 0x182b488>, <kernel.Type object at 0x182b878>) of role type named numbers
% Using role type
% Declaring num:Type
% FOF formula (<kernel.Constant object at 0x180b320>, <kernel.Constant object at 0x182b5a8>) of role type named agent_THFTYPE_i
% Using role type
% Declaring agent_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x182b8c0>, <kernel.Single object at 0x182b680>) of role type named attribute_THFTYPE_i
% Using role type
% Declaring attribute_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x182b488>, <kernel.DependentProduct object at 0x182b710>) of role type named before_THFTYPE_IiioI
% Using role type
% Declaring before_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x182b878>, <kernel.DependentProduct object at 0x182b8c0>) of role type named brother_THFTYPE_IiioI
% Using role type
% Declaring brother_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x182b7e8>, <kernel.Single object at 0x182b680>) of role type named connected_THFTYPE_i
% Using role type
% Declaring connected_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x182b488>, <kernel.DependentProduct object at 0x182b878>) of role type named disjoint_THFTYPE_IiioI
% Using role type
% Declaring disjoint_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x182b710>, <kernel.DependentProduct object at 0x182b680>) of role type named domain_THFTYPE_IIiiIiioI
% Using role type
% Declaring domain_THFTYPE_IIiiIiioI:((fofType->fofType)->(fofType->(fofType->Prop)))
% FOF formula (<kernel.Constant object at 0x182b830>, <kernel.DependentProduct object at 0x182b950>) of role type named domain_THFTYPE_IIiioIiioI
% Using role type
% Declaring domain_THFTYPE_IIiioIiioI:((fofType->(fofType->Prop))->(fofType->(fofType->Prop)))
% FOF formula (<kernel.Constant object at 0x182b3f8>, <kernel.DependentProduct object at 0x182b710>) of role type named domain_THFTYPE_IiiioI
% Using role type
% Declaring domain_THFTYPE_IiiioI:(fofType->(fofType->(fofType->Prop)))
% FOF formula (<kernel.Constant object at 0x182b488>, <kernel.Single object at 0x182b170>) of role type named equal_THFTYPE_i
% Using role type
% Declaring equal_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x182b830>, <kernel.Single object at 0x182b878>) of role type named familyRelation_THFTYPE_i
% Using role type
% Declaring familyRelation_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x182b3f8>, <kernel.Single object at 0x182b7e8>) of role type named greaterThan_THFTYPE_i
% Using role type
% Declaring greaterThan_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x182b488>, <kernel.DependentProduct object at 0x1888680>) of role type named holdsDuring_THFTYPE_IiooI
% Using role type
% Declaring holdsDuring_THFTYPE_IiooI:(fofType->(Prop->Prop))
% FOF formula (<kernel.Constant object at 0x182b488>, <kernel.DependentProduct object at 0x1888ab8>) of role type named instance_THFTYPE_IIIiioIIiioIoIioI
% Using role type
% Declaring instance_THFTYPE_IIIiioIIiioIoIioI:(((fofType->(fofType->Prop))->((fofType->(fofType->Prop))->Prop))->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x182b3f8>, <kernel.DependentProduct object at 0x18886c8>) of role type named instance_THFTYPE_IIiiIioI
% Using role type
% Declaring instance_THFTYPE_IIiiIioI:((fofType->fofType)->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x182b488>, <kernel.DependentProduct object at 0x1888cb0>) of role type named instance_THFTYPE_IIiioIioI
% Using role type
% Declaring instance_THFTYPE_IIiioIioI:((fofType->(fofType->Prop))->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x182b4d0>, <kernel.DependentProduct object at 0x1888bd8>) of role type named instance_THFTYPE_IIiooIioI
% Using role type
% Declaring instance_THFTYPE_IIiooIioI:((fofType->(Prop->Prop))->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x182b488>, <kernel.DependentProduct object at 0x1888a28>) of role type named instance_THFTYPE_IiioI
% Using role type
% Declaring instance_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x18889e0>, <kernel.Single object at 0x1888a28>) of role type named lAsymmetricRelation_THFTYPE_i
% Using role type
% Declaring lAsymmetricRelation_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1888680>, <kernel.DependentProduct object at 0x187f2d8>) of role type named lBeginFn_THFTYPE_IiiI
% Using role type
% Declaring lBeginFn_THFTYPE_IiiI:(fofType->fofType)
% FOF formula (<kernel.Constant object at 0x1888ab8>, <kernel.Single object at 0x18889e0>) of role type named lBeginFn_THFTYPE_i
% Using role type
% Declaring lBeginFn_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1888cb0>, <kernel.Single object at 0x1888758>) of role type named lBill_THFTYPE_i
% Using role type
% Declaring lBill_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1888680>, <kernel.Single object at 0x1888a28>) of role type named lBinaryPredicate_THFTYPE_i
% Using role type
% Declaring lBinaryPredicate_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1888ab8>, <kernel.Single object at 0x1888680>) of role type named lBob_THFTYPE_i
% Using role type
% Declaring lBob_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1888cb0>, <kernel.DependentProduct object at 0x1829878>) of role type named lEndFn_THFTYPE_IiiI
% Using role type
% Declaring lEndFn_THFTYPE_IiiI:(fofType->fofType)
% FOF formula (<kernel.Constant object at 0x1888680>, <kernel.Single object at 0x1888a28>) of role type named lEndFn_THFTYPE_i
% Using role type
% Declaring lEndFn_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x187f2d8>, <kernel.Single object at 0x187f1b8>) of role type named lEquivalenceRelation_THFTYPE_i
% Using role type
% Declaring lEquivalenceRelation_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x187f2d8>, <kernel.Single object at 0x1888cb0>) of role type named lHuman_THFTYPE_i
% Using role type
% Declaring lHuman_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829998>, <kernel.Single object at 0x1888a28>) of role type named lIrreflexiveRelation_THFTYPE_i
% Using role type
% Declaring lIrreflexiveRelation_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1888cb0>, <kernel.Single object at 0x18295a8>) of role type named lMary_THFTYPE_i
% Using role type
% Declaring lMary_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1888a28>, <kernel.Single object at 0x1829998>) of role type named lMeasureFn_THFTYPE_i
% Using role type
% Declaring lMeasureFn_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1888a28>, <kernel.Single object at 0x1829638>) of role type named lMultiplicationFn_THFTYPE_i
% Using role type
% Declaring lMultiplicationFn_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829ab8>, <kernel.Single object at 0x1829878>) of role type named lObject_THFTYPE_i
% Using role type
% Declaring lObject_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829a28>, <kernel.Single object at 0x1829710>) of role type named lOrganism_THFTYPE_i
% Using role type
% Declaring lOrganism_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829128>, <kernel.Single object at 0x1829050>) of role type named lProcess_THFTYPE_i
% Using role type
% Declaring lProcess_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829ab8>, <kernel.Single object at 0x1829830>) of role type named lQuantity_THFTYPE_i
% Using role type
% Declaring lQuantity_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829a28>, <kernel.Single object at 0x1829320>) of role type named lSue_THFTYPE_i
% Using role type
% Declaring lSue_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829a28>, <kernel.Single object at 0x1829320>) of role type named lSymmetricRelation_THFTYPE_i
% Using role type
% Declaring lSymmetricRelation_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x18295a8>, <kernel.Single object at 0x1829f80>) of role type named lTemporalRelation_THFTYPE_i
% Using role type
% Declaring lTemporalRelation_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829320>, <kernel.Single object at 0x1829ab8>) of role type named lTimeInterval_THFTYPE_i
% Using role type
% Declaring lTimeInterval_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829e60>, <kernel.Single object at 0x18297a0>) of role type named lTimePoint_THFTYPE_i
% Using role type
% Declaring lTimePoint_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829e60>, <kernel.Single object at 0x18297a0>) of role type named lTotalValuedRelation_THFTYPE_i
% Using role type
% Declaring lTotalValuedRelation_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829290>, <kernel.Single object at 0x1829e60>) of role type named lTransitiveRelation_THFTYPE_i
% Using role type
% Declaring lTransitiveRelation_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x18295a8>, <kernel.Single object at 0x18294d0>) of role type named lUnaryFunction_THFTYPE_i
% Using role type
% Declaring lUnaryFunction_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829e60>, <kernel.DependentProduct object at 0x144e368>) of role type named lWhenFn_THFTYPE_IiiI
% Using role type
% Declaring lWhenFn_THFTYPE_IiiI:(fofType->fofType)
% FOF formula (<kernel.Constant object at 0x1829950>, <kernel.Single object at 0x18294d0>) of role type named lWhenFn_THFTYPE_i
% Using role type
% Declaring lWhenFn_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x18297a0>, <kernel.DependentProduct object at 0x144e5f0>) of role type named located_THFTYPE_IiioI
% Using role type
% Declaring located_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x18297a0>, <kernel.DependentProduct object at 0x144e5f0>) of role type named meetsTemporally_THFTYPE_IiioI
% Using role type
% Declaring meetsTemporally_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x1829950>, <kernel.Single object at 0x1829128>) of role type named n1_THFTYPE_i
% Using role type
% Declaring n1_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x18294d0>, <kernel.Single object at 0x1829128>) of role type named n2_THFTYPE_i
% Using role type
% Declaring n2_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829950>, <kernel.DependentProduct object at 0x144e368>) of role type named parent_THFTYPE_IiioI
% Using role type
% Declaring parent_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x18297a0>, <kernel.DependentProduct object at 0x144e710>) of role type named part_THFTYPE_IiioI
% Using role type
% Declaring part_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x1829950>, <kernel.Single object at 0x144e7e8>) of role type named patient_THFTYPE_i
% Using role type
% Declaring patient_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x1829950>, <kernel.DependentProduct object at 0x144e5f0>) of role type named range_THFTYPE_IiioI
% Using role type
% Declaring range_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x144e5a8>, <kernel.Single object at 0x144e5f0>) of role type named relatedInternalConcept_THFTYPE_i
% Using role type
% Declaring relatedInternalConcept_THFTYPE_i:fofType
% FOF formula (<kernel.Constant object at 0x144e710>, <kernel.DependentProduct object at 0x1433950>) of role type named sibling_THFTYPE_IiioI
% Using role type
% Declaring sibling_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x144e3f8>, <kernel.DependentProduct object at 0x14338c0>) of role type named sister_THFTYPE_IiioI
% Using role type
% Declaring sister_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x144eef0>, <kernel.DependentProduct object at 0x14338c0>) of role type named subProcess_THFTYPE_IiioI
% Using role type
% Declaring subProcess_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x144e7e8>, <kernel.DependentProduct object at 0x14338c0>) of role type named subclass_THFTYPE_IiioI
% Using role type
% Declaring subclass_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x1433830>, <kernel.DependentProduct object at 0x14337e8>) of role type named subrelation_THFTYPE_IIiioIIiioIoI
% Using role type
% Declaring subrelation_THFTYPE_IIiioIIiioIoI:((fofType->(fofType->Prop))->((fofType->(fofType->Prop))->Prop))
% FOF formula (<kernel.Constant object at 0x14337a0>, <kernel.DependentProduct object at 0x1433878>) of role type named subrelation_THFTYPE_IIiioIioI
% Using role type
% Declaring subrelation_THFTYPE_IIiioIioI:((fofType->(fofType->Prop))->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x1433908>, <kernel.DependentProduct object at 0x14335a8>) of role type named subrelation_THFTYPE_IIioIIioIoI
% Using role type
% Declaring subrelation_THFTYPE_IIioIIioIoI:((fofType->Prop)->((fofType->Prop)->Prop))
% FOF formula (<kernel.Constant object at 0x144e710>, <kernel.DependentProduct object at 0x14335a8>) of role type named subrelation_THFTYPE_IiioI
% Using role type
% Declaring subrelation_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (<kernel.Constant object at 0x1433878>, <kernel.DependentProduct object at 0x1433758>) of role type named temporalPart_THFTYPE_IiioI
% Using role type
% Declaring temporalPart_THFTYPE_IiioI:(fofType->(fofType->Prop))
% FOF formula (forall (X:fofType) (Y:fofType) (Z:fofType), (((and ((subclass_THFTYPE_IiioI X) Y)) ((instance_THFTYPE_IiioI Z) X))->((instance_THFTYPE_IiioI Z) Y))) of role axiom named ax
% A new axiom: (forall (X:fofType) (Y:fofType) (Z:fofType), (((and ((subclass_THFTYPE_IiioI X) Y)) ((instance_THFTYPE_IiioI Z) X))->((instance_THFTYPE_IiioI Z) Y)))
% FOF formula (not (((eq fofType) lBob_THFTYPE_i) lBill_THFTYPE_i)) of role axiom named ax_001
% A new axiom: (not (((eq fofType) lBob_THFTYPE_i) lBill_THFTYPE_i))
% FOF formula (not (((eq fofType) lBob_THFTYPE_i) lBill_THFTYPE_i)) of role axiom named ax_002
% A new axiom: (not (((eq fofType) lBob_THFTYPE_i) lBill_THFTYPE_i))
% FOF formula (forall (CLASS1:fofType) (CLASS2:fofType), ((((eq fofType) CLASS1) CLASS2)->(forall (THING:fofType), ((iff ((instance_THFTYPE_IiioI THING) CLASS1)) ((instance_THFTYPE_IiioI THING) CLASS2))))) of role axiom named ax_003
% A new axiom: (forall (CLASS1:fofType) (CLASS2:fofType), ((((eq fofType) CLASS1) CLASS2)->(forall (THING:fofType), ((iff ((instance_THFTYPE_IiioI THING) CLASS1)) ((instance_THFTYPE_IiioI THING) CLASS2)))))
% FOF formula ((and ((and (not ((sister_THFTYPE_IiioI lMary_THFTYPE_i) lSue_THFTYPE_i))) (not ((sister_THFTYPE_IiioI lMary_THFTYPE_i) lBill_THFTYPE_i)))) (not ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lMary_THFTYPE_i))) of role axiom named ax_004
% A new axiom: ((and ((and (not ((sister_THFTYPE_IiioI lMary_THFTYPE_i) lSue_THFTYPE_i))) (not ((sister_THFTYPE_IiioI lMary_THFTYPE_i) lBill_THFTYPE_i)))) (not ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lMary_THFTYPE_i)))
% FOF formula (forall (REL2:(fofType->Prop)) (ROW:fofType) (REL1:(fofType->Prop)), (((and ((subrelation_THFTYPE_IIioIIioIoI REL1) REL2)) (REL1 ROW))->(REL2 ROW))) of role axiom named ax_005
% A new axiom: (forall (REL2:(fofType->Prop)) (ROW:fofType) (REL1:(fofType->Prop)), (((and ((subrelation_THFTYPE_IIioIIioIoI REL1) REL2)) (REL1 ROW))->(REL2 ROW)))
% FOF formula (forall (OBJ1:fofType) (OBJ2:fofType), (((located_THFTYPE_IiioI OBJ1) OBJ2)->(forall (SUB:fofType), (((part_THFTYPE_IiioI SUB) OBJ1)->((located_THFTYPE_IiioI SUB) OBJ2))))) of role axiom named ax_006
% A new axiom: (forall (OBJ1:fofType) (OBJ2:fofType), (((located_THFTYPE_IiioI OBJ1) OBJ2)->(forall (SUB:fofType), (((part_THFTYPE_IiioI SUB) OBJ1)->((located_THFTYPE_IiioI SUB) OBJ2)))))
% FOF formula (forall (INTERVAL:fofType), (((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)->((before_THFTYPE_IiioI (lBeginFn_THFTYPE_IiiI INTERVAL)) (lEndFn_THFTYPE_IiiI INTERVAL)))) of role axiom named ax_007
% A new axiom: (forall (INTERVAL:fofType), (((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)->((before_THFTYPE_IiioI (lBeginFn_THFTYPE_IiiI INTERVAL)) (lEndFn_THFTYPE_IiiI INTERVAL))))
% FOF formula ((range_THFTYPE_IiioI lEndFn_THFTYPE_i) lTimePoint_THFTYPE_i) of role axiom named ax_008
% A new axiom: ((range_THFTYPE_IiioI lEndFn_THFTYPE_i) lTimePoint_THFTYPE_i)
% FOF formula (forall (THING2:fofType) (THING1:fofType), ((((eq fofType) THING1) THING2)->(forall (CLASS:fofType), ((iff ((instance_THFTYPE_IiioI THING1) CLASS)) ((instance_THFTYPE_IiioI THING2) CLASS))))) of role axiom named ax_009
% A new axiom: (forall (THING2:fofType) (THING1:fofType), ((((eq fofType) THING1) THING2)->(forall (CLASS:fofType), ((iff ((instance_THFTYPE_IiioI THING1) CLASS)) ((instance_THFTYPE_IiioI THING2) CLASS)))))
% FOF formula (forall (CLASS1:fofType) (REL:fofType) (CLASS2:fofType), (((and ((range_THFTYPE_IiioI REL) CLASS1)) ((range_THFTYPE_IiioI REL) CLASS2))->((or ((subclass_THFTYPE_IiioI CLASS1) CLASS2)) ((subclass_THFTYPE_IiioI CLASS2) CLASS1)))) of role axiom named ax_010
% A new axiom: (forall (CLASS1:fofType) (REL:fofType) (CLASS2:fofType), (((and ((range_THFTYPE_IiioI REL) CLASS1)) ((range_THFTYPE_IiioI REL) CLASS2))->((or ((subclass_THFTYPE_IiioI CLASS1) CLASS2)) ((subclass_THFTYPE_IiioI CLASS2) CLASS1))))
% FOF formula (forall (CLASS1:fofType) (CLASS2:fofType), ((iff ((disjoint_THFTYPE_IiioI CLASS1) CLASS2)) (forall (INST:fofType), (not ((and ((instance_THFTYPE_IiioI INST) CLASS1)) ((instance_THFTYPE_IiioI INST) CLASS2)))))) of role axiom named ax_011
% A new axiom: (forall (CLASS1:fofType) (CLASS2:fofType), ((iff ((disjoint_THFTYPE_IiioI CLASS1) CLASS2)) (forall (INST:fofType), (not ((and ((instance_THFTYPE_IiioI INST) CLASS1)) ((instance_THFTYPE_IiioI INST) CLASS2))))))
% FOF formula (forall (SUBPROC:fofType) (PROC:fofType), (((subProcess_THFTYPE_IiioI SUBPROC) PROC)->((temporalPart_THFTYPE_IiioI (lWhenFn_THFTYPE_IiiI SUBPROC)) (lWhenFn_THFTYPE_IiiI PROC)))) of role axiom named ax_012
% A new axiom: (forall (SUBPROC:fofType) (PROC:fofType), (((subProcess_THFTYPE_IiioI SUBPROC) PROC)->((temporalPart_THFTYPE_IiioI (lWhenFn_THFTYPE_IiiI SUBPROC)) (lWhenFn_THFTYPE_IiiI PROC))))
% FOF formula (forall (CLASS:fofType) (CHILD:fofType) (PARENT:fofType), (((and ((and ((parent_THFTYPE_IiioI CHILD) PARENT)) ((subclass_THFTYPE_IiioI CLASS) lOrganism_THFTYPE_i))) ((instance_THFTYPE_IiioI PARENT) CLASS))->((instance_THFTYPE_IiioI CHILD) CLASS))) of role axiom named ax_013
% A new axiom: (forall (CLASS:fofType) (CHILD:fofType) (PARENT:fofType), (((and ((and ((parent_THFTYPE_IiioI CHILD) PARENT)) ((subclass_THFTYPE_IiioI CLASS) lOrganism_THFTYPE_i))) ((instance_THFTYPE_IiioI PARENT) CLASS))->((instance_THFTYPE_IiioI CHILD) CLASS)))
% FOF formula (forall (INTERVAL1:fofType) (INTERVAL2:fofType), (((and (((eq fofType) (lBeginFn_THFTYPE_IiiI INTERVAL1)) (lBeginFn_THFTYPE_IiiI INTERVAL2))) (((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL1)) (lEndFn_THFTYPE_IiiI INTERVAL2)))->(((eq fofType) INTERVAL1) INTERVAL2))) of role axiom named ax_014
% A new axiom: (forall (INTERVAL1:fofType) (INTERVAL2:fofType), (((and (((eq fofType) (lBeginFn_THFTYPE_IiiI INTERVAL1)) (lBeginFn_THFTYPE_IiiI INTERVAL2))) (((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL1)) (lEndFn_THFTYPE_IiiI INTERVAL2)))->(((eq fofType) INTERVAL1) INTERVAL2)))
% FOF formula ((subclass_THFTYPE_IiioI lAsymmetricRelation_THFTYPE_i) lIrreflexiveRelation_THFTYPE_i) of role axiom named ax_015
% A new axiom: ((subclass_THFTYPE_IiioI lAsymmetricRelation_THFTYPE_i) lIrreflexiveRelation_THFTYPE_i)
% FOF formula (forall (REL2:fofType) (CLASS1:fofType) (REL1:fofType), (((and ((subrelation_THFTYPE_IiioI REL1) REL2)) ((range_THFTYPE_IiioI REL2) CLASS1))->((range_THFTYPE_IiioI REL1) CLASS1))) of role axiom named ax_016
% A new axiom: (forall (REL2:fofType) (CLASS1:fofType) (REL1:fofType), (((and ((subrelation_THFTYPE_IiioI REL1) REL2)) ((range_THFTYPE_IiioI REL2) CLASS1))->((range_THFTYPE_IiioI REL1) CLASS1)))
% FOF formula ((range_THFTYPE_IiioI lBeginFn_THFTYPE_i) lTimePoint_THFTYPE_i) of role axiom named ax_017
% A new axiom: ((range_THFTYPE_IiioI lBeginFn_THFTYPE_i) lTimePoint_THFTYPE_i)
% FOF formula (forall (NUMBER:fofType) (CLASS1:fofType) (REL:fofType) (CLASS2:fofType), (((and (((domain_THFTYPE_IiiioI REL) NUMBER) CLASS1)) (((domain_THFTYPE_IiiioI REL) NUMBER) CLASS2))->((or ((subclass_THFTYPE_IiioI CLASS1) CLASS2)) ((subclass_THFTYPE_IiioI CLASS2) CLASS1)))) of role axiom named ax_018
% A new axiom: (forall (NUMBER:fofType) (CLASS1:fofType) (REL:fofType) (CLASS2:fofType), (((and (((domain_THFTYPE_IiiioI REL) NUMBER) CLASS1)) (((domain_THFTYPE_IiiioI REL) NUMBER) CLASS2))->((or ((subclass_THFTYPE_IiioI CLASS1) CLASS2)) ((subclass_THFTYPE_IiioI CLASS2) CLASS1))))
% FOF formula ((and ((and (not (((eq fofType) lMary_THFTYPE_i) lSue_THFTYPE_i))) (not (((eq fofType) lMary_THFTYPE_i) lBill_THFTYPE_i)))) (not (((eq fofType) lBob_THFTYPE_i) lMary_THFTYPE_i))) of role axiom named ax_019
% A new axiom: ((and ((and (not (((eq fofType) lMary_THFTYPE_i) lSue_THFTYPE_i))) (not (((eq fofType) lMary_THFTYPE_i) lBill_THFTYPE_i)))) (not (((eq fofType) lBob_THFTYPE_i) lMary_THFTYPE_i)))
% FOF formula ((and (not (((eq fofType) lSue_THFTYPE_i) lBill_THFTYPE_i))) (not (((eq fofType) lSue_THFTYPE_i) lBob_THFTYPE_i))) of role axiom named ax_020
% A new axiom: ((and (not (((eq fofType) lSue_THFTYPE_i) lBill_THFTYPE_i))) (not (((eq fofType) lSue_THFTYPE_i) lBob_THFTYPE_i)))
% FOF formula ((and (not (((eq fofType) lSue_THFTYPE_i) lBill_THFTYPE_i))) (not (((eq fofType) lSue_THFTYPE_i) lBob_THFTYPE_i))) of role axiom named ax_021
% A new axiom: ((and (not (((eq fofType) lSue_THFTYPE_i) lBill_THFTYPE_i))) (not (((eq fofType) lSue_THFTYPE_i) lBob_THFTYPE_i)))
% FOF formula (forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lTransitiveRelation_THFTYPE_i)) (forall (INST1:fofType) (INST2:fofType) (INST3:fofType), (((and ((REL INST1) INST2)) ((REL INST2) INST3))->((REL INST1) INST3))))) of role axiom named ax_022
% A new axiom: (forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lTransitiveRelation_THFTYPE_i)) (forall (INST1:fofType) (INST2:fofType) (INST3:fofType), (((and ((REL INST1) INST2)) ((REL INST2) INST3))->((REL INST1) INST3)))))
% FOF formula (forall (SUBPROC:fofType) (PROC:fofType), (((subProcess_THFTYPE_IiioI SUBPROC) PROC)->(forall (REGION:fofType), (((located_THFTYPE_IiioI PROC) REGION)->((located_THFTYPE_IiioI SUBPROC) REGION))))) of role axiom named ax_023
% A new axiom: (forall (SUBPROC:fofType) (PROC:fofType), (((subProcess_THFTYPE_IiioI SUBPROC) PROC)->(forall (REGION:fofType), (((located_THFTYPE_IiioI PROC) REGION)->((located_THFTYPE_IiioI SUBPROC) REGION)))))
% FOF formula (forall (POINT:fofType) (INTERVAL:fofType), ((((eq fofType) (lBeginFn_THFTYPE_IiiI INTERVAL)) POINT)->(forall (OTHERPOINT:fofType), (((and ((temporalPart_THFTYPE_IiioI OTHERPOINT) INTERVAL)) (not (((eq fofType) OTHERPOINT) POINT)))->((before_THFTYPE_IiioI POINT) OTHERPOINT))))) of role axiom named ax_024
% A new axiom: (forall (POINT:fofType) (INTERVAL:fofType), ((((eq fofType) (lBeginFn_THFTYPE_IiiI INTERVAL)) POINT)->(forall (OTHERPOINT:fofType), (((and ((temporalPart_THFTYPE_IiioI OTHERPOINT) INTERVAL)) (not (((eq fofType) OTHERPOINT) POINT)))->((before_THFTYPE_IiioI POINT) OTHERPOINT)))))
% FOF formula ((subclass_THFTYPE_IiioI lEquivalenceRelation_THFTYPE_i) lSymmetricRelation_THFTYPE_i) of role axiom named ax_025
% A new axiom: ((subclass_THFTYPE_IiioI lEquivalenceRelation_THFTYPE_i) lSymmetricRelation_THFTYPE_i)
% FOF formula (forall (POINT:fofType), (((instance_THFTYPE_IiioI POINT) lTimePoint_THFTYPE_i)->((ex fofType) (fun (INTERVAL:fofType)=> ((and ((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)) ((temporalPart_THFTYPE_IiioI POINT) INTERVAL)))))) of role axiom named ax_026
% A new axiom: (forall (POINT:fofType), (((instance_THFTYPE_IiioI POINT) lTimePoint_THFTYPE_i)->((ex fofType) (fun (INTERVAL:fofType)=> ((and ((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)) ((temporalPart_THFTYPE_IiioI POINT) INTERVAL))))))
% FOF formula (forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lSymmetricRelation_THFTYPE_i)) (forall (INST1:fofType) (INST2:fofType), (((REL INST1) INST2)->((REL INST2) INST1))))) of role axiom named ax_027
% A new axiom: (forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lSymmetricRelation_THFTYPE_i)) (forall (INST1:fofType) (INST2:fofType), (((REL INST1) INST2)->((REL INST2) INST1)))))
% FOF formula (forall (ORG1:fofType) (ORG2:fofType) (PARENT:fofType), (((and ((sibling_THFTYPE_IiioI ORG1) ORG2)) ((parent_THFTYPE_IiioI ORG1) PARENT))->((parent_THFTYPE_IiioI ORG2) PARENT))) of role axiom named ax_028
% A new axiom: (forall (ORG1:fofType) (ORG2:fofType) (PARENT:fofType), (((and ((sibling_THFTYPE_IiioI ORG1) ORG2)) ((parent_THFTYPE_IiioI ORG1) PARENT))->((parent_THFTYPE_IiioI ORG2) PARENT)))
% FOF formula ((and ((and ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBill_THFTYPE_i)) ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBob_THFTYPE_i))) ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lBill_THFTYPE_i)) of role axiom named ax_029
% A new axiom: ((and ((and ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBill_THFTYPE_i)) ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBob_THFTYPE_i))) ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lBill_THFTYPE_i))
% FOF formula ((and ((and ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBill_THFTYPE_i)) ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBob_THFTYPE_i))) ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lBill_THFTYPE_i)) of role axiom named ax_030
% A new axiom: ((and ((and ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBill_THFTYPE_i)) ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBob_THFTYPE_i))) ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lBill_THFTYPE_i))
% FOF formula (forall (ORGANISM:fofType), (((instance_THFTYPE_IiioI ORGANISM) lOrganism_THFTYPE_i)->((ex fofType) (fun (PARENT:fofType)=> ((parent_THFTYPE_IiioI ORGANISM) PARENT))))) of role axiom named ax_031
% A new axiom: (forall (ORGANISM:fofType), (((instance_THFTYPE_IiioI ORGANISM) lOrganism_THFTYPE_i)->((ex fofType) (fun (PARENT:fofType)=> ((parent_THFTYPE_IiioI ORGANISM) PARENT)))))
% FOF formula (forall (TIME:fofType) (SITUATION:Prop), (((holdsDuring_THFTYPE_IiooI TIME) (not SITUATION))->(not ((holdsDuring_THFTYPE_IiooI TIME) SITUATION)))) of role axiom named ax_032
% A new axiom: (forall (TIME:fofType) (SITUATION:Prop), (((holdsDuring_THFTYPE_IiooI TIME) (not SITUATION))->(not ((holdsDuring_THFTYPE_IiooI TIME) SITUATION))))
% FOF formula (forall (POINT:fofType) (INTERVAL:fofType), ((((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL)) POINT)->(forall (OTHERPOINT:fofType), (((and ((temporalPart_THFTYPE_IiioI OTHERPOINT) INTERVAL)) (not (((eq fofType) OTHERPOINT) POINT)))->((before_THFTYPE_IiioI OTHERPOINT) POINT))))) of role axiom named ax_033
% A new axiom: (forall (POINT:fofType) (INTERVAL:fofType), ((((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL)) POINT)->(forall (OTHERPOINT:fofType), (((and ((temporalPart_THFTYPE_IiioI OTHERPOINT) INTERVAL)) (not (((eq fofType) OTHERPOINT) POINT)))->((before_THFTYPE_IiioI OTHERPOINT) POINT)))))
% FOF formula (forall (OBJ:fofType) (PROCESS:fofType), (((located_THFTYPE_IiioI PROCESS) OBJ)->(forall (SUB:fofType), (((subProcess_THFTYPE_IiioI SUB) PROCESS)->((located_THFTYPE_IiioI SUB) OBJ))))) of role axiom named ax_034
% A new axiom: (forall (OBJ:fofType) (PROCESS:fofType), (((located_THFTYPE_IiioI PROCESS) OBJ)->(forall (SUB:fofType), (((subProcess_THFTYPE_IiioI SUB) PROCESS)->((located_THFTYPE_IiioI SUB) OBJ)))))
% FOF formula ((range_THFTYPE_IiioI lWhenFn_THFTYPE_i) lTimeInterval_THFTYPE_i) of role axiom named ax_035
% A new axiom: ((range_THFTYPE_IiioI lWhenFn_THFTYPE_i) lTimeInterval_THFTYPE_i)
% FOF formula (forall (INTERVAL:fofType), (((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)->((ex fofType) (fun (POINT:fofType)=> ((and ((instance_THFTYPE_IiioI POINT) lTimePoint_THFTYPE_i)) ((temporalPart_THFTYPE_IiioI POINT) INTERVAL)))))) of role axiom named ax_036
% A new axiom: (forall (INTERVAL:fofType), (((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)->((ex fofType) (fun (POINT:fofType)=> ((and ((instance_THFTYPE_IiioI POINT) lTimePoint_THFTYPE_i)) ((temporalPart_THFTYPE_IiioI POINT) INTERVAL))))))
% FOF formula (forall (PARENT2:fofType) (ORGANISM1:fofType) (ORGANISM2:fofType) (PARENT1:fofType), (((and ((and ((and ((and ((and ((parent_THFTYPE_IiioI ORGANISM1) PARENT1)) ((parent_THFTYPE_IiioI ORGANISM2) PARENT1))) ((parent_THFTYPE_IiioI ORGANISM1) PARENT2))) ((parent_THFTYPE_IiioI ORGANISM2) PARENT2))) (not (((eq fofType) ORGANISM1) ORGANISM2)))) (not (((eq fofType) PARENT1) PARENT2)))->((sibling_THFTYPE_IiioI ORGANISM1) ORGANISM2))) of role axiom named ax_037
% A new axiom: (forall (PARENT2:fofType) (ORGANISM1:fofType) (ORGANISM2:fofType) (PARENT1:fofType), (((and ((and ((and ((and ((and ((parent_THFTYPE_IiioI ORGANISM1) PARENT1)) ((parent_THFTYPE_IiioI ORGANISM2) PARENT1))) ((parent_THFTYPE_IiioI ORGANISM1) PARENT2))) ((parent_THFTYPE_IiioI ORGANISM2) PARENT2))) (not (((eq fofType) ORGANISM1) ORGANISM2)))) (not (((eq fofType) PARENT1) PARENT2)))->((sibling_THFTYPE_IiioI ORGANISM1) ORGANISM2)))
% FOF formula (forall (INTERVAL1:fofType) (INTERVAL2:fofType), ((iff ((meetsTemporally_THFTYPE_IiioI INTERVAL1) INTERVAL2)) (((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL1)) (lBeginFn_THFTYPE_IiiI INTERVAL2)))) of role axiom named ax_038
% A new axiom: (forall (INTERVAL1:fofType) (INTERVAL2:fofType), ((iff ((meetsTemporally_THFTYPE_IiioI INTERVAL1) INTERVAL2)) (((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL1)) (lBeginFn_THFTYPE_IiiI INTERVAL2))))
% FOF formula (forall (SITUATION:Prop) (TIME2:fofType) (TIME1:fofType), (((and ((holdsDuring_THFTYPE_IiooI TIME1) SITUATION)) ((temporalPart_THFTYPE_IiioI TIME2) TIME1))->((holdsDuring_THFTYPE_IiooI TIME2) SITUATION))) of role axiom named ax_039
% A new axiom: (forall (SITUATION:Prop) (TIME2:fofType) (TIME1:fofType), (((and ((holdsDuring_THFTYPE_IiooI TIME1) SITUATION)) ((temporalPart_THFTYPE_IiioI TIME2) TIME1))->((holdsDuring_THFTYPE_IiooI TIME2) SITUATION)))
% FOF formula ((subclass_THFTYPE_IiioI lEquivalenceRelation_THFTYPE_i) lTransitiveRelation_THFTYPE_i) of role axiom named ax_040
% A new axiom: ((subclass_THFTYPE_IiioI lEquivalenceRelation_THFTYPE_i) lTransitiveRelation_THFTYPE_i)
% FOF formula ((range_THFTYPE_IiioI lMultiplicationFn_THFTYPE_i) lQuantity_THFTYPE_i) of role axiom named ax_041
% A new axiom: ((range_THFTYPE_IiioI lMultiplicationFn_THFTYPE_i) lQuantity_THFTYPE_i)
% FOF formula (forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lIrreflexiveRelation_THFTYPE_i)) (forall (INST:fofType), (not ((REL INST) INST))))) of role axiom named ax_042
% A new axiom: (forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lIrreflexiveRelation_THFTYPE_i)) (forall (INST:fofType), (not ((REL INST) INST)))))
% FOF formula (forall (NUMBER:fofType) (PRED1:fofType) (CLASS1:fofType) (PRED2:fofType), (((and ((subrelation_THFTYPE_IiioI PRED1) PRED2)) (((domain_THFTYPE_IiiioI PRED2) NUMBER) CLASS1))->(((domain_THFTYPE_IiiioI PRED1) NUMBER) CLASS1))) of role axiom named ax_043
% A new axiom: (forall (NUMBER:fofType) (PRED1:fofType) (CLASS1:fofType) (PRED2:fofType), (((and ((subrelation_THFTYPE_IiioI PRED1) PRED2)) (((domain_THFTYPE_IiiioI PRED2) NUMBER) CLASS1))->(((domain_THFTYPE_IiiioI PRED1) NUMBER) CLASS1)))
% FOF formula (forall (CHILD:fofType) (PARENT:fofType), (((parent_THFTYPE_IiioI CHILD) PARENT)->((before_THFTYPE_IiioI (lBeginFn_THFTYPE_IiiI (lWhenFn_THFTYPE_IiiI PARENT))) (lBeginFn_THFTYPE_IiiI (lWhenFn_THFTYPE_IiiI CHILD))))) of role axiom named ax_044
% A new axiom: (forall (CHILD:fofType) (PARENT:fofType), (((parent_THFTYPE_IiioI CHILD) PARENT)->((before_THFTYPE_IiioI (lBeginFn_THFTYPE_IiiI (lWhenFn_THFTYPE_IiiI PARENT))) (lBeginFn_THFTYPE_IiiI (lWhenFn_THFTYPE_IiiI CHILD)))))
% FOF formula ((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i) of role axiom named ax_045
% A new axiom: ((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI connected_THFTYPE_i) lBinaryPredicate_THFTYPE_i) of role axiom named ax_046
% A new axiom: ((instance_THFTYPE_IiioI connected_THFTYPE_i) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI temporalPart_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i) of role axiom named ax_047
% A new axiom: ((instance_THFTYPE_IIiioIioI temporalPart_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI disjoint_THFTYPE_IiioI) lSymmetricRelation_THFTYPE_i) of role axiom named ax_048
% A new axiom: ((instance_THFTYPE_IIiioIioI disjoint_THFTYPE_IiioI) lSymmetricRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI range_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i) of role axiom named ax_049
% A new axiom: ((instance_THFTYPE_IIiioIioI range_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI sister_THFTYPE_IiioI) n2_THFTYPE_i) lHuman_THFTYPE_i) of role axiom named ax_050
% A new axiom: (((domain_THFTYPE_IIiioIiioI sister_THFTYPE_IiioI) n2_THFTYPE_i) lHuman_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI range_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_051
% A new axiom: ((instance_THFTYPE_IIiioIioI range_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_052
% A new axiom: ((instance_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i) of role axiom named ax_053
% A new axiom: ((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI equal_THFTYPE_i) lEquivalenceRelation_THFTYPE_i) of role axiom named ax_054
% A new axiom: ((instance_THFTYPE_IiioI equal_THFTYPE_i) lEquivalenceRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI subProcess_THFTYPE_IiioI) n1_THFTYPE_i) lProcess_THFTYPE_i) of role axiom named ax_055
% A new axiom: (((domain_THFTYPE_IIiioIiioI subProcess_THFTYPE_IiioI) n1_THFTYPE_i) lProcess_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_056
% A new axiom: ((instance_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((subrelation_THFTYPE_IIiioIIiioIoI sister_THFTYPE_IiioI) sibling_THFTYPE_IiioI) of role axiom named ax_057
% A new axiom: ((subrelation_THFTYPE_IIiioIIiioIoI sister_THFTYPE_IiioI) sibling_THFTYPE_IiioI)
% FOF formula ((instance_THFTYPE_IIiioIioI disjoint_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_058
% A new axiom: ((instance_THFTYPE_IIiioIioI disjoint_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i) of role axiom named ax_059
% A new axiom: ((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI temporalPart_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_060
% A new axiom: ((instance_THFTYPE_IIiioIioI temporalPart_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI brother_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i) of role axiom named ax_061
% A new axiom: ((instance_THFTYPE_IIiioIioI brother_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI parent_THFTYPE_IiioI) n1_THFTYPE_i) lOrganism_THFTYPE_i) of role axiom named ax_062
% A new axiom: (((domain_THFTYPE_IIiioIiioI parent_THFTYPE_IiioI) n1_THFTYPE_i) lOrganism_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI meetsTemporally_THFTYPE_IiioI) n1_THFTYPE_i) lTimeInterval_THFTYPE_i) of role axiom named ax_063
% A new axiom: (((domain_THFTYPE_IIiioIiioI meetsTemporally_THFTYPE_IiioI) n1_THFTYPE_i) lTimeInterval_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI subProcess_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_064
% A new axiom: ((instance_THFTYPE_IIiioIioI subProcess_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI sibling_THFTYPE_IiioI) n1_THFTYPE_i) lOrganism_THFTYPE_i) of role axiom named ax_065
% A new axiom: (((domain_THFTYPE_IIiioIiioI sibling_THFTYPE_IiioI) n1_THFTYPE_i) lOrganism_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI familyRelation_THFTYPE_i) n2_THFTYPE_i) lOrganism_THFTYPE_i) of role axiom named ax_066
% A new axiom: (((domain_THFTYPE_IiiioI familyRelation_THFTYPE_i) n2_THFTYPE_i) lOrganism_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lTransitiveRelation_THFTYPE_i) of role axiom named ax_067
% A new axiom: ((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lTransitiveRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI familyRelation_THFTYPE_i) n1_THFTYPE_i) lOrganism_THFTYPE_i) of role axiom named ax_068
% A new axiom: (((domain_THFTYPE_IiiioI familyRelation_THFTYPE_i) n1_THFTYPE_i) lOrganism_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lBinaryPredicate_THFTYPE_i) of role axiom named ax_069
% A new axiom: ((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiiIioI lBeginFn_THFTYPE_IiiI) lUnaryFunction_THFTYPE_i) of role axiom named ax_070
% A new axiom: ((instance_THFTYPE_IIiiIioI lBeginFn_THFTYPE_IiiI) lUnaryFunction_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI parent_THFTYPE_IiioI) n2_THFTYPE_i) lOrganism_THFTYPE_i) of role axiom named ax_071
% A new axiom: (((domain_THFTYPE_IIiioIiioI parent_THFTYPE_IiioI) n2_THFTYPE_i) lOrganism_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI sister_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i) of role axiom named ax_072
% A new axiom: ((instance_THFTYPE_IIiioIioI sister_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI before_THFTYPE_IiioI) n1_THFTYPE_i) lTimePoint_THFTYPE_i) of role axiom named ax_073
% A new axiom: (((domain_THFTYPE_IIiioIiioI before_THFTYPE_IiioI) n1_THFTYPE_i) lTimePoint_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI lMultiplicationFn_THFTYPE_i) n2_THFTYPE_i) lQuantity_THFTYPE_i) of role axiom named ax_074
% A new axiom: (((domain_THFTYPE_IiiioI lMultiplicationFn_THFTYPE_i) n2_THFTYPE_i) lQuantity_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI subProcess_THFTYPE_IiioI) n2_THFTYPE_i) lProcess_THFTYPE_i) of role axiom named ax_075
% A new axiom: (((domain_THFTYPE_IIiioIiioI subProcess_THFTYPE_IiioI) n2_THFTYPE_i) lProcess_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiiIioI lBeginFn_THFTYPE_IiiI) lTotalValuedRelation_THFTYPE_i) of role axiom named ax_076
% A new axiom: ((instance_THFTYPE_IIiiIioI lBeginFn_THFTYPE_IiiI) lTotalValuedRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI agent_THFTYPE_i) n1_THFTYPE_i) lProcess_THFTYPE_i) of role axiom named ax_077
% A new axiom: (((domain_THFTYPE_IiiioI agent_THFTYPE_i) n1_THFTYPE_i) lProcess_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI equal_THFTYPE_i) lBinaryPredicate_THFTYPE_i) of role axiom named ax_078
% A new axiom: ((instance_THFTYPE_IiioI equal_THFTYPE_i) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI relatedInternalConcept_THFTYPE_i) lBinaryPredicate_THFTYPE_i) of role axiom named ax_079
% A new axiom: ((instance_THFTYPE_IiioI relatedInternalConcept_THFTYPE_i) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_080
% A new axiom: ((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI sister_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i) of role axiom named ax_081
% A new axiom: ((instance_THFTYPE_IIiioIioI sister_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI subclass_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_082
% A new axiom: ((instance_THFTYPE_IIiioIioI subclass_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI relatedInternalConcept_THFTYPE_i) lEquivalenceRelation_THFTYPE_i) of role axiom named ax_083
% A new axiom: ((instance_THFTYPE_IiioI relatedInternalConcept_THFTYPE_i) lEquivalenceRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI sibling_THFTYPE_IiioI) n2_THFTYPE_i) lOrganism_THFTYPE_i) of role axiom named ax_084
% A new axiom: (((domain_THFTYPE_IIiioIiioI sibling_THFTYPE_IiioI) n2_THFTYPE_i) lOrganism_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI greaterThan_THFTYPE_i) n2_THFTYPE_i) lQuantity_THFTYPE_i) of role axiom named ax_085
% A new axiom: (((domain_THFTYPE_IiiioI greaterThan_THFTYPE_i) n2_THFTYPE_i) lQuantity_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lUnaryFunction_THFTYPE_i) of role axiom named ax_086
% A new axiom: ((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lUnaryFunction_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI familyRelation_THFTYPE_i) lEquivalenceRelation_THFTYPE_i) of role axiom named ax_087
% A new axiom: ((instance_THFTYPE_IiioI familyRelation_THFTYPE_i) lEquivalenceRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI attribute_THFTYPE_i) lAsymmetricRelation_THFTYPE_i) of role axiom named ax_088
% A new axiom: ((instance_THFTYPE_IiioI attribute_THFTYPE_i) lAsymmetricRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiiIioI lWhenFn_THFTYPE_IiiI) lUnaryFunction_THFTYPE_i) of role axiom named ax_089
% A new axiom: ((instance_THFTYPE_IIiiIioI lWhenFn_THFTYPE_IiiI) lUnaryFunction_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lTemporalRelation_THFTYPE_i) of role axiom named ax_090
% A new axiom: ((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lTemporalRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI lMultiplicationFn_THFTYPE_i) n1_THFTYPE_i) lQuantity_THFTYPE_i) of role axiom named ax_091
% A new axiom: (((domain_THFTYPE_IiiioI lMultiplicationFn_THFTYPE_i) n1_THFTYPE_i) lQuantity_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI patient_THFTYPE_i) n1_THFTYPE_i) lProcess_THFTYPE_i) of role axiom named ax_092
% A new axiom: (((domain_THFTYPE_IiiioI patient_THFTYPE_i) n1_THFTYPE_i) lProcess_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i) of role axiom named ax_093
% A new axiom: ((instance_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i) of role axiom named ax_094
% A new axiom: ((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI lMultiplicationFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i) of role axiom named ax_095
% A new axiom: ((instance_THFTYPE_IiioI lMultiplicationFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i) of role axiom named ax_096
% A new axiom: ((instance_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i)
% FOF formula ((subrelation_THFTYPE_IIiioIIiioIoI brother_THFTYPE_IiioI) sibling_THFTYPE_IiioI) of role axiom named ax_097
% A new axiom: ((subrelation_THFTYPE_IIiioIIiioIoI brother_THFTYPE_IiioI) sibling_THFTYPE_IiioI)
% FOF formula ((instance_THFTYPE_IiioI lMeasureFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i) of role axiom named ax_098
% A new axiom: ((instance_THFTYPE_IiioI lMeasureFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI before_THFTYPE_IiioI) n2_THFTYPE_i) lTimePoint_THFTYPE_i) of role axiom named ax_099
% A new axiom: (((domain_THFTYPE_IIiioIiioI before_THFTYPE_IiioI) n2_THFTYPE_i) lTimePoint_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI connected_THFTYPE_i) lSymmetricRelation_THFTYPE_i) of role axiom named ax_100
% A new axiom: ((instance_THFTYPE_IiioI connected_THFTYPE_i) lSymmetricRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI familyRelation_THFTYPE_i) lBinaryPredicate_THFTYPE_i) of role axiom named ax_101
% A new axiom: ((instance_THFTYPE_IiioI familyRelation_THFTYPE_i) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lIrreflexiveRelation_THFTYPE_i) of role axiom named ax_102
% A new axiom: ((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lIrreflexiveRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i) of role axiom named ax_103
% A new axiom: ((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI connected_THFTYPE_i) n2_THFTYPE_i) lObject_THFTYPE_i) of role axiom named ax_104
% A new axiom: (((domain_THFTYPE_IiiioI connected_THFTYPE_i) n2_THFTYPE_i) lObject_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI meetsTemporally_THFTYPE_IiioI) n2_THFTYPE_i) lTimeInterval_THFTYPE_i) of role axiom named ax_105
% A new axiom: (((domain_THFTYPE_IIiioIiioI meetsTemporally_THFTYPE_IiioI) n2_THFTYPE_i) lTimeInterval_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i) of role axiom named ax_106
% A new axiom: ((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiooIioI holdsDuring_THFTYPE_IiooI) lAsymmetricRelation_THFTYPE_i) of role axiom named ax_107
% A new axiom: ((instance_THFTYPE_IIiooIioI holdsDuring_THFTYPE_IiooI) lAsymmetricRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI brother_THFTYPE_IiioI) n2_THFTYPE_i) lHuman_THFTYPE_i) of role axiom named ax_108
% A new axiom: (((domain_THFTYPE_IIiioIiioI brother_THFTYPE_IiioI) n2_THFTYPE_i) lHuman_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI brother_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i) of role axiom named ax_109
% A new axiom: ((instance_THFTYPE_IIiioIioI brother_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIIiioIIiioIoIioI subrelation_THFTYPE_IIiioIIiioIoI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_110
% A new axiom: ((instance_THFTYPE_IIIiioIIiioIoIioI subrelation_THFTYPE_IIiioIIiioIoI) lBinaryPredicate_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI lEndFn_THFTYPE_i) n1_THFTYPE_i) lTimeInterval_THFTYPE_i) of role axiom named ax_111
% A new axiom: (((domain_THFTYPE_IiiioI lEndFn_THFTYPE_i) n1_THFTYPE_i) lTimeInterval_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI connected_THFTYPE_i) n1_THFTYPE_i) lObject_THFTYPE_i) of role axiom named ax_112
% A new axiom: (((domain_THFTYPE_IiiioI connected_THFTYPE_i) n1_THFTYPE_i) lObject_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI greaterThan_THFTYPE_i) n1_THFTYPE_i) lQuantity_THFTYPE_i) of role axiom named ax_113
% A new axiom: (((domain_THFTYPE_IiiioI greaterThan_THFTYPE_i) n1_THFTYPE_i) lQuantity_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiiIioI lWhenFn_THFTYPE_IiiI) lTotalValuedRelation_THFTYPE_i) of role axiom named ax_114
% A new axiom: ((instance_THFTYPE_IIiiIioI lWhenFn_THFTYPE_IiiI) lTotalValuedRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI part_THFTYPE_IiioI) n1_THFTYPE_i) lObject_THFTYPE_i) of role axiom named ax_115
% A new axiom: (((domain_THFTYPE_IIiioIiioI part_THFTYPE_IiioI) n1_THFTYPE_i) lObject_THFTYPE_i)
% FOF formula ((subrelation_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) familyRelation_THFTYPE_i) of role axiom named ax_116
% A new axiom: ((subrelation_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) familyRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiiIioI lBeginFn_THFTYPE_IiiI) lTemporalRelation_THFTYPE_i) of role axiom named ax_117
% A new axiom: ((instance_THFTYPE_IIiiIioI lBeginFn_THFTYPE_IiiI) lTemporalRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IiiioI attribute_THFTYPE_i) n1_THFTYPE_i) lObject_THFTYPE_i) of role axiom named ax_118
% A new axiom: (((domain_THFTYPE_IiiioI attribute_THFTYPE_i) n1_THFTYPE_i) lObject_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiiIiioI lBeginFn_THFTYPE_IiiI) n1_THFTYPE_i) lTimeInterval_THFTYPE_i) of role axiom named ax_119
% A new axiom: (((domain_THFTYPE_IIiiIiioI lBeginFn_THFTYPE_IiiI) n1_THFTYPE_i) lTimeInterval_THFTYPE_i)
% FOF formula ((subrelation_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) familyRelation_THFTYPE_i) of role axiom named ax_120
% A new axiom: ((subrelation_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) familyRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI located_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i) of role axiom named ax_121
% A new axiom: ((instance_THFTYPE_IIiioIioI located_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI instance_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_122
% A new axiom: ((instance_THFTYPE_IIiioIioI instance_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IiioI attribute_THFTYPE_i) lIrreflexiveRelation_THFTYPE_i) of role axiom named ax_123
% A new axiom: ((instance_THFTYPE_IiioI attribute_THFTYPE_i) lIrreflexiveRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) lSymmetricRelation_THFTYPE_i) of role axiom named ax_124
% A new axiom: ((instance_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) lSymmetricRelation_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiooIioI holdsDuring_THFTYPE_IiooI) lBinaryPredicate_THFTYPE_i) of role axiom named ax_125
% A new axiom: ((instance_THFTYPE_IIiooIioI holdsDuring_THFTYPE_IiooI) lBinaryPredicate_THFTYPE_i)
% FOF formula ((instance_THFTYPE_IIiiIioI lWhenFn_THFTYPE_IiiI) lTemporalRelation_THFTYPE_i) of role axiom named ax_126
% A new axiom: ((instance_THFTYPE_IIiiIioI lWhenFn_THFTYPE_IiiI) lTemporalRelation_THFTYPE_i)
% FOF formula (((domain_THFTYPE_IIiioIiioI part_THFTYPE_IiioI) n2_THFTYPE_i) lObject_THFTYPE_i) of role axiom named ax_127
% A new axiom: (((domain_THFTYPE_IIiioIiioI part_THFTYPE_IiioI) n2_THFTYPE_i) lObject_THFTYPE_i)
% FOF formula ((ex (fofType->(fofType->Prop))) (fun (R:(fofType->(fofType->Prop)))=> ((and ((and ((R lBob_THFTYPE_i) lBill_THFTYPE_i)) ((R lSue_THFTYPE_i) lBob_THFTYPE_i))) (not (forall (X:fofType) (Y:fofType), ((R X) Y)))))) of role conjecture named con
% Conjecture to prove = ((ex (fofType->(fofType->Prop))) (fun (R:(fofType->(fofType->Prop)))=> ((and ((and ((R lBob_THFTYPE_i) lBill_THFTYPE_i)) ((R lSue_THFTYPE_i) lBob_THFTYPE_i))) (not (forall (X:fofType) (Y:fofType), ((R X) Y)))))):Prop
% Parameter num_DUMMY:num.
% We need to prove ['((ex (fofType->(fofType->Prop))) (fun (R:(fofType->(fofType->Prop)))=> ((and ((and ((R lBob_THFTYPE_i) lBill_THFTYPE_i)) ((R lSue_THFTYPE_i) lBob_THFTYPE_i))) (not (forall (X:fofType) (Y:fofType), ((R X) Y))))))']
% Parameter num:Type.
% Parameter fofType:Type.
% Parameter agent_THFTYPE_i:fofType.
% Parameter attribute_THFTYPE_i:fofType.
% Parameter before_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter brother_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter connected_THFTYPE_i:fofType.
% Parameter disjoint_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter domain_THFTYPE_IIiiIiioI:((fofType->fofType)->(fofType->(fofType->Prop))).
% Parameter domain_THFTYPE_IIiioIiioI:((fofType->(fofType->Prop))->(fofType->(fofType->Prop))).
% Parameter domain_THFTYPE_IiiioI:(fofType->(fofType->(fofType->Prop))).
% Parameter equal_THFTYPE_i:fofType.
% Parameter familyRelation_THFTYPE_i:fofType.
% Parameter greaterThan_THFTYPE_i:fofType.
% Parameter holdsDuring_THFTYPE_IiooI:(fofType->(Prop->Prop)).
% Parameter instance_THFTYPE_IIIiioIIiioIoIioI:(((fofType->(fofType->Prop))->((fofType->(fofType->Prop))->Prop))->(fofType->Prop)).
% Parameter instance_THFTYPE_IIiiIioI:((fofType->fofType)->(fofType->Prop)).
% Parameter instance_THFTYPE_IIiioIioI:((fofType->(fofType->Prop))->(fofType->Prop)).
% Parameter instance_THFTYPE_IIiooIioI:((fofType->(Prop->Prop))->(fofType->Prop)).
% Parameter instance_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter lAsymmetricRelation_THFTYPE_i:fofType.
% Parameter lBeginFn_THFTYPE_IiiI:(fofType->fofType).
% Parameter lBeginFn_THFTYPE_i:fofType.
% Parameter lBill_THFTYPE_i:fofType.
% Parameter lBinaryPredicate_THFTYPE_i:fofType.
% Parameter lBob_THFTYPE_i:fofType.
% Parameter lEndFn_THFTYPE_IiiI:(fofType->fofType).
% Parameter lEndFn_THFTYPE_i:fofType.
% Parameter lEquivalenceRelation_THFTYPE_i:fofType.
% Parameter lHuman_THFTYPE_i:fofType.
% Parameter lIrreflexiveRelation_THFTYPE_i:fofType.
% Parameter lMary_THFTYPE_i:fofType.
% Parameter lMeasureFn_THFTYPE_i:fofType.
% Parameter lMultiplicationFn_THFTYPE_i:fofType.
% Parameter lObject_THFTYPE_i:fofType.
% Parameter lOrganism_THFTYPE_i:fofType.
% Parameter lProcess_THFTYPE_i:fofType.
% Parameter lQuantity_THFTYPE_i:fofType.
% Parameter lSue_THFTYPE_i:fofType.
% Parameter lSymmetricRelation_THFTYPE_i:fofType.
% Parameter lTemporalRelation_THFTYPE_i:fofType.
% Parameter lTimeInterval_THFTYPE_i:fofType.
% Parameter lTimePoint_THFTYPE_i:fofType.
% Parameter lTotalValuedRelation_THFTYPE_i:fofType.
% Parameter lTransitiveRelation_THFTYPE_i:fofType.
% Parameter lUnaryFunction_THFTYPE_i:fofType.
% Parameter lWhenFn_THFTYPE_IiiI:(fofType->fofType).
% Parameter lWhenFn_THFTYPE_i:fofType.
% Parameter located_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter meetsTemporally_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter n1_THFTYPE_i:fofType.
% Parameter n2_THFTYPE_i:fofType.
% Parameter parent_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter part_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter patient_THFTYPE_i:fofType.
% Parameter range_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter relatedInternalConcept_THFTYPE_i:fofType.
% Parameter sibling_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter sister_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter subProcess_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter subclass_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter subrelation_THFTYPE_IIiioIIiioIoI:((fofType->(fofType->Prop))->((fofType->(fofType->Prop))->Prop)).
% Parameter subrelation_THFTYPE_IIiioIioI:((fofType->(fofType->Prop))->(fofType->Prop)).
% Parameter subrelation_THFTYPE_IIioIIioIoI:((fofType->Prop)->((fofType->Prop)->Prop)).
% Parameter subrelation_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Parameter temporalPart_THFTYPE_IiioI:(fofType->(fofType->Prop)).
% Axiom ax:(forall (X:fofType) (Y:fofType) (Z:fofType), (((and ((subclass_THFTYPE_IiioI X) Y)) ((instance_THFTYPE_IiioI Z) X))->((instance_THFTYPE_IiioI Z) Y))).
% Axiom ax_001:(not (((eq fofType) lBob_THFTYPE_i) lBill_THFTYPE_i)).
% Axiom ax_002:(not (((eq fofType) lBob_THFTYPE_i) lBill_THFTYPE_i)).
% Axiom ax_003:(forall (CLASS1:fofType) (CLASS2:fofType), ((((eq fofType) CLASS1) CLASS2)->(forall (THING:fofType), ((iff ((instance_THFTYPE_IiioI THING) CLASS1)) ((instance_THFTYPE_IiioI THING) CLASS2))))).
% Axiom ax_004:((and ((and (not ((sister_THFTYPE_IiioI lMary_THFTYPE_i) lSue_THFTYPE_i))) (not ((sister_THFTYPE_IiioI lMary_THFTYPE_i) lBill_THFTYPE_i)))) (not ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lMary_THFTYPE_i))).
% Axiom ax_005:(forall (REL2:(fofType->Prop)) (ROW:fofType) (REL1:(fofType->Prop)), (((and ((subrelation_THFTYPE_IIioIIioIoI REL1) REL2)) (REL1 ROW))->(REL2 ROW))).
% Axiom ax_006:(forall (OBJ1:fofType) (OBJ2:fofType), (((located_THFTYPE_IiioI OBJ1) OBJ2)->(forall (SUB:fofType), (((part_THFTYPE_IiioI SUB) OBJ1)->((located_THFTYPE_IiioI SUB) OBJ2))))).
% Axiom ax_007:(forall (INTERVAL:fofType), (((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)->((before_THFTYPE_IiioI (lBeginFn_THFTYPE_IiiI INTERVAL)) (lEndFn_THFTYPE_IiiI INTERVAL)))).
% Axiom ax_008:((range_THFTYPE_IiioI lEndFn_THFTYPE_i) lTimePoint_THFTYPE_i).
% Axiom ax_009:(forall (THING2:fofType) (THING1:fofType), ((((eq fofType) THING1) THING2)->(forall (CLASS:fofType), ((iff ((instance_THFTYPE_IiioI THING1) CLASS)) ((instance_THFTYPE_IiioI THING2) CLASS))))).
% Axiom ax_010:(forall (CLASS1:fofType) (REL:fofType) (CLASS2:fofType), (((and ((range_THFTYPE_IiioI REL) CLASS1)) ((range_THFTYPE_IiioI REL) CLASS2))->((or ((subclass_THFTYPE_IiioI CLASS1) CLASS2)) ((subclass_THFTYPE_IiioI CLASS2) CLASS1)))).
% Axiom ax_011:(forall (CLASS1:fofType) (CLASS2:fofType), ((iff ((disjoint_THFTYPE_IiioI CLASS1) CLASS2)) (forall (INST:fofType), (not ((and ((instance_THFTYPE_IiioI INST) CLASS1)) ((instance_THFTYPE_IiioI INST) CLASS2)))))).
% Axiom ax_012:(forall (SUBPROC:fofType) (PROC:fofType), (((subProcess_THFTYPE_IiioI SUBPROC) PROC)->((temporalPart_THFTYPE_IiioI (lWhenFn_THFTYPE_IiiI SUBPROC)) (lWhenFn_THFTYPE_IiiI PROC)))).
% Axiom ax_013:(forall (CLASS:fofType) (CHILD:fofType) (PARENT:fofType), (((and ((and ((parent_THFTYPE_IiioI CHILD) PARENT)) ((subclass_THFTYPE_IiioI CLASS) lOrganism_THFTYPE_i))) ((instance_THFTYPE_IiioI PARENT) CLASS))->((instance_THFTYPE_IiioI CHILD) CLASS))).
% Axiom ax_014:(forall (INTERVAL1:fofType) (INTERVAL2:fofType), (((and (((eq fofType) (lBeginFn_THFTYPE_IiiI INTERVAL1)) (lBeginFn_THFTYPE_IiiI INTERVAL2))) (((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL1)) (lEndFn_THFTYPE_IiiI INTERVAL2)))->(((eq fofType) INTERVAL1) INTERVAL2))).
% Axiom ax_015:((subclass_THFTYPE_IiioI lAsymmetricRelation_THFTYPE_i) lIrreflexiveRelation_THFTYPE_i).
% Axiom ax_016:(forall (REL2:fofType) (CLASS1:fofType) (REL1:fofType), (((and ((subrelation_THFTYPE_IiioI REL1) REL2)) ((range_THFTYPE_IiioI REL2) CLASS1))->((range_THFTYPE_IiioI REL1) CLASS1))).
% Axiom ax_017:((range_THFTYPE_IiioI lBeginFn_THFTYPE_i) lTimePoint_THFTYPE_i).
% Axiom ax_018:(forall (NUMBER:fofType) (CLASS1:fofType) (REL:fofType) (CLASS2:fofType), (((and (((domain_THFTYPE_IiiioI REL) NUMBER) CLASS1)) (((domain_THFTYPE_IiiioI REL) NUMBER) CLASS2))->((or ((subclass_THFTYPE_IiioI CLASS1) CLASS2)) ((subclass_THFTYPE_IiioI CLASS2) CLASS1)))).
% Axiom ax_019:((and ((and (not (((eq fofType) lMary_THFTYPE_i) lSue_THFTYPE_i))) (not (((eq fofType) lMary_THFTYPE_i) lBill_THFTYPE_i)))) (not (((eq fofType) lBob_THFTYPE_i) lMary_THFTYPE_i))).
% Axiom ax_020:((and (not (((eq fofType) lSue_THFTYPE_i) lBill_THFTYPE_i))) (not (((eq fofType) lSue_THFTYPE_i) lBob_THFTYPE_i))).
% Axiom ax_021:((and (not (((eq fofType) lSue_THFTYPE_i) lBill_THFTYPE_i))) (not (((eq fofType) lSue_THFTYPE_i) lBob_THFTYPE_i))).
% Axiom ax_022:(forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lTransitiveRelation_THFTYPE_i)) (forall (INST1:fofType) (INST2:fofType) (INST3:fofType), (((and ((REL INST1) INST2)) ((REL INST2) INST3))->((REL INST1) INST3))))).
% Axiom ax_023:(forall (SUBPROC:fofType) (PROC:fofType), (((subProcess_THFTYPE_IiioI SUBPROC) PROC)->(forall (REGION:fofType), (((located_THFTYPE_IiioI PROC) REGION)->((located_THFTYPE_IiioI SUBPROC) REGION))))).
% Axiom ax_024:(forall (POINT:fofType) (INTERVAL:fofType), ((((eq fofType) (lBeginFn_THFTYPE_IiiI INTERVAL)) POINT)->(forall (OTHERPOINT:fofType), (((and ((temporalPart_THFTYPE_IiioI OTHERPOINT) INTERVAL)) (not (((eq fofType) OTHERPOINT) POINT)))->((before_THFTYPE_IiioI POINT) OTHERPOINT))))).
% Axiom ax_025:((subclass_THFTYPE_IiioI lEquivalenceRelation_THFTYPE_i) lSymmetricRelation_THFTYPE_i).
% Axiom ax_026:(forall (POINT:fofType), (((instance_THFTYPE_IiioI POINT) lTimePoint_THFTYPE_i)->((ex fofType) (fun (INTERVAL:fofType)=> ((and ((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)) ((temporalPart_THFTYPE_IiioI POINT) INTERVAL)))))).
% Axiom ax_027:(forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lSymmetricRelation_THFTYPE_i)) (forall (INST1:fofType) (INST2:fofType), (((REL INST1) INST2)->((REL INST2) INST1))))).
% Axiom ax_028:(forall (ORG1:fofType) (ORG2:fofType) (PARENT:fofType), (((and ((sibling_THFTYPE_IiioI ORG1) ORG2)) ((parent_THFTYPE_IiioI ORG1) PARENT))->((parent_THFTYPE_IiioI ORG2) PARENT))).
% Axiom ax_029:((and ((and ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBill_THFTYPE_i)) ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBob_THFTYPE_i))) ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lBill_THFTYPE_i)).
% Axiom ax_030:((and ((and ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBill_THFTYPE_i)) ((sister_THFTYPE_IiioI lSue_THFTYPE_i) lBob_THFTYPE_i))) ((brother_THFTYPE_IiioI lBob_THFTYPE_i) lBill_THFTYPE_i)).
% Axiom ax_031:(forall (ORGANISM:fofType), (((instance_THFTYPE_IiioI ORGANISM) lOrganism_THFTYPE_i)->((ex fofType) (fun (PARENT:fofType)=> ((parent_THFTYPE_IiioI ORGANISM) PARENT))))).
% Axiom ax_032:(forall (TIME:fofType) (SITUATION:Prop), (((holdsDuring_THFTYPE_IiooI TIME) (not SITUATION))->(not ((holdsDuring_THFTYPE_IiooI TIME) SITUATION)))).
% Axiom ax_033:(forall (POINT:fofType) (INTERVAL:fofType), ((((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL)) POINT)->(forall (OTHERPOINT:fofType), (((and ((temporalPart_THFTYPE_IiioI OTHERPOINT) INTERVAL)) (not (((eq fofType) OTHERPOINT) POINT)))->((before_THFTYPE_IiioI OTHERPOINT) POINT))))).
% Axiom ax_034:(forall (OBJ:fofType) (PROCESS:fofType), (((located_THFTYPE_IiioI PROCESS) OBJ)->(forall (SUB:fofType), (((subProcess_THFTYPE_IiioI SUB) PROCESS)->((located_THFTYPE_IiioI SUB) OBJ))))).
% Axiom ax_035:((range_THFTYPE_IiioI lWhenFn_THFTYPE_i) lTimeInterval_THFTYPE_i).
% Axiom ax_036:(forall (INTERVAL:fofType), (((instance_THFTYPE_IiioI INTERVAL) lTimeInterval_THFTYPE_i)->((ex fofType) (fun (POINT:fofType)=> ((and ((instance_THFTYPE_IiioI POINT) lTimePoint_THFTYPE_i)) ((temporalPart_THFTYPE_IiioI POINT) INTERVAL)))))).
% Axiom ax_037:(forall (PARENT2:fofType) (ORGANISM1:fofType) (ORGANISM2:fofType) (PARENT1:fofType), (((and ((and ((and ((and ((and ((parent_THFTYPE_IiioI ORGANISM1) PARENT1)) ((parent_THFTYPE_IiioI ORGANISM2) PARENT1))) ((parent_THFTYPE_IiioI ORGANISM1) PARENT2))) ((parent_THFTYPE_IiioI ORGANISM2) PARENT2))) (not (((eq fofType) ORGANISM1) ORGANISM2)))) (not (((eq fofType) PARENT1) PARENT2)))->((sibling_THFTYPE_IiioI ORGANISM1) ORGANISM2))).
% Axiom ax_038:(forall (INTERVAL1:fofType) (INTERVAL2:fofType), ((iff ((meetsTemporally_THFTYPE_IiioI INTERVAL1) INTERVAL2)) (((eq fofType) (lEndFn_THFTYPE_IiiI INTERVAL1)) (lBeginFn_THFTYPE_IiiI INTERVAL2)))).
% Axiom ax_039:(forall (SITUATION:Prop) (TIME2:fofType) (TIME1:fofType), (((and ((holdsDuring_THFTYPE_IiooI TIME1) SITUATION)) ((temporalPart_THFTYPE_IiioI TIME2) TIME1))->((holdsDuring_THFTYPE_IiooI TIME2) SITUATION))).
% Axiom ax_040:((subclass_THFTYPE_IiioI lEquivalenceRelation_THFTYPE_i) lTransitiveRelation_THFTYPE_i).
% Axiom ax_041:((range_THFTYPE_IiioI lMultiplicationFn_THFTYPE_i) lQuantity_THFTYPE_i).
% Axiom ax_042:(forall (REL:(fofType->(fofType->Prop))), ((iff ((instance_THFTYPE_IIiioIioI REL) lIrreflexiveRelation_THFTYPE_i)) (forall (INST:fofType), (not ((REL INST) INST))))).
% Axiom ax_043:(forall (NUMBER:fofType) (PRED1:fofType) (CLASS1:fofType) (PRED2:fofType), (((and ((subrelation_THFTYPE_IiioI PRED1) PRED2)) (((domain_THFTYPE_IiiioI PRED2) NUMBER) CLASS1))->(((domain_THFTYPE_IiiioI PRED1) NUMBER) CLASS1))).
% Axiom ax_044:(forall (CHILD:fofType) (PARENT:fofType), (((parent_THFTYPE_IiioI CHILD) PARENT)->((before_THFTYPE_IiioI (lBeginFn_THFTYPE_IiiI (lWhenFn_THFTYPE_IiiI PARENT))) (lBeginFn_THFTYPE_IiiI (lWhenFn_THFTYPE_IiiI CHILD))))).
% Axiom ax_045:((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i).
% Axiom ax_046:((instance_THFTYPE_IiioI connected_THFTYPE_i) lBinaryPredicate_THFTYPE_i).
% Axiom ax_047:((instance_THFTYPE_IIiioIioI temporalPart_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i).
% Axiom ax_048:((instance_THFTYPE_IIiioIioI disjoint_THFTYPE_IiioI) lSymmetricRelation_THFTYPE_i).
% Axiom ax_049:((instance_THFTYPE_IIiioIioI range_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i).
% Axiom ax_050:(((domain_THFTYPE_IIiioIiioI sister_THFTYPE_IiioI) n2_THFTYPE_i) lHuman_THFTYPE_i).
% Axiom ax_051:((instance_THFTYPE_IIiioIioI range_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_052:((instance_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_053:((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i).
% Axiom ax_054:((instance_THFTYPE_IiioI equal_THFTYPE_i) lEquivalenceRelation_THFTYPE_i).
% Axiom ax_055:(((domain_THFTYPE_IIiioIiioI subProcess_THFTYPE_IiioI) n1_THFTYPE_i) lProcess_THFTYPE_i).
% Axiom ax_056:((instance_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_057:((subrelation_THFTYPE_IIiioIIiioIoI sister_THFTYPE_IiioI) sibling_THFTYPE_IiioI).
% Axiom ax_058:((instance_THFTYPE_IIiioIioI disjoint_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_059:((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lTemporalRelation_THFTYPE_i).
% Axiom ax_060:((instance_THFTYPE_IIiioIioI temporalPart_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_061:((instance_THFTYPE_IIiioIioI brother_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i).
% Axiom ax_062:(((domain_THFTYPE_IIiioIiioI parent_THFTYPE_IiioI) n1_THFTYPE_i) lOrganism_THFTYPE_i).
% Axiom ax_063:(((domain_THFTYPE_IIiioIiioI meetsTemporally_THFTYPE_IiioI) n1_THFTYPE_i) lTimeInterval_THFTYPE_i).
% Axiom ax_064:((instance_THFTYPE_IIiioIioI subProcess_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_065:(((domain_THFTYPE_IIiioIiioI sibling_THFTYPE_IiioI) n1_THFTYPE_i) lOrganism_THFTYPE_i).
% Axiom ax_066:(((domain_THFTYPE_IiiioI familyRelation_THFTYPE_i) n2_THFTYPE_i) lOrganism_THFTYPE_i).
% Axiom ax_067:((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lTransitiveRelation_THFTYPE_i).
% Axiom ax_068:(((domain_THFTYPE_IiiioI familyRelation_THFTYPE_i) n1_THFTYPE_i) lOrganism_THFTYPE_i).
% Axiom ax_069:((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lBinaryPredicate_THFTYPE_i).
% Axiom ax_070:((instance_THFTYPE_IIiiIioI lBeginFn_THFTYPE_IiiI) lUnaryFunction_THFTYPE_i).
% Axiom ax_071:(((domain_THFTYPE_IIiioIiioI parent_THFTYPE_IiioI) n2_THFTYPE_i) lOrganism_THFTYPE_i).
% Axiom ax_072:((instance_THFTYPE_IIiioIioI sister_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i).
% Axiom ax_073:(((domain_THFTYPE_IIiioIiioI before_THFTYPE_IiioI) n1_THFTYPE_i) lTimePoint_THFTYPE_i).
% Axiom ax_074:(((domain_THFTYPE_IiiioI lMultiplicationFn_THFTYPE_i) n2_THFTYPE_i) lQuantity_THFTYPE_i).
% Axiom ax_075:(((domain_THFTYPE_IIiioIiioI subProcess_THFTYPE_IiioI) n2_THFTYPE_i) lProcess_THFTYPE_i).
% Axiom ax_076:((instance_THFTYPE_IIiiIioI lBeginFn_THFTYPE_IiiI) lTotalValuedRelation_THFTYPE_i).
% Axiom ax_077:(((domain_THFTYPE_IiiioI agent_THFTYPE_i) n1_THFTYPE_i) lProcess_THFTYPE_i).
% Axiom ax_078:((instance_THFTYPE_IiioI equal_THFTYPE_i) lBinaryPredicate_THFTYPE_i).
% Axiom ax_079:((instance_THFTYPE_IiioI relatedInternalConcept_THFTYPE_i) lBinaryPredicate_THFTYPE_i).
% Axiom ax_080:((instance_THFTYPE_IIiioIioI meetsTemporally_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_081:((instance_THFTYPE_IIiioIioI sister_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i).
% Axiom ax_082:((instance_THFTYPE_IIiioIioI subclass_THFTYPE_IiioI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_083:((instance_THFTYPE_IiioI relatedInternalConcept_THFTYPE_i) lEquivalenceRelation_THFTYPE_i).
% Axiom ax_084:(((domain_THFTYPE_IIiioIiioI sibling_THFTYPE_IiioI) n2_THFTYPE_i) lOrganism_THFTYPE_i).
% Axiom ax_085:(((domain_THFTYPE_IiiioI greaterThan_THFTYPE_i) n2_THFTYPE_i) lQuantity_THFTYPE_i).
% Axiom ax_086:((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lUnaryFunction_THFTYPE_i).
% Axiom ax_087:((instance_THFTYPE_IiioI familyRelation_THFTYPE_i) lEquivalenceRelation_THFTYPE_i).
% Axiom ax_088:((instance_THFTYPE_IiioI attribute_THFTYPE_i) lAsymmetricRelation_THFTYPE_i).
% Axiom ax_089:((instance_THFTYPE_IIiiIioI lWhenFn_THFTYPE_IiiI) lUnaryFunction_THFTYPE_i).
% Axiom ax_090:((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lTemporalRelation_THFTYPE_i).
% Axiom ax_091:(((domain_THFTYPE_IiiioI lMultiplicationFn_THFTYPE_i) n1_THFTYPE_i) lQuantity_THFTYPE_i).
% Axiom ax_092:(((domain_THFTYPE_IiiioI patient_THFTYPE_i) n1_THFTYPE_i) lProcess_THFTYPE_i).
% Axiom ax_093:((instance_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) lAsymmetricRelation_THFTYPE_i).
% Axiom ax_094:((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i).
% Axiom ax_095:((instance_THFTYPE_IiioI lMultiplicationFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i).
% Axiom ax_096:((instance_THFTYPE_IIiioIioI sibling_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i).
% Axiom ax_097:((subrelation_THFTYPE_IIiioIIiioIoI brother_THFTYPE_IiioI) sibling_THFTYPE_IiioI).
% Axiom ax_098:((instance_THFTYPE_IiioI lMeasureFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i).
% Axiom ax_099:(((domain_THFTYPE_IIiioIiioI before_THFTYPE_IiioI) n2_THFTYPE_i) lTimePoint_THFTYPE_i).
% Axiom ax_100:((instance_THFTYPE_IiioI connected_THFTYPE_i) lSymmetricRelation_THFTYPE_i).
% Axiom ax_101:((instance_THFTYPE_IiioI familyRelation_THFTYPE_i) lBinaryPredicate_THFTYPE_i).
% Axiom ax_102:((instance_THFTYPE_IiioI greaterThan_THFTYPE_i) lIrreflexiveRelation_THFTYPE_i).
% Axiom ax_103:((instance_THFTYPE_IiioI lEndFn_THFTYPE_i) lTotalValuedRelation_THFTYPE_i).
% Axiom ax_104:(((domain_THFTYPE_IiiioI connected_THFTYPE_i) n2_THFTYPE_i) lObject_THFTYPE_i).
% Axiom ax_105:(((domain_THFTYPE_IIiioIiioI meetsTemporally_THFTYPE_IiioI) n2_THFTYPE_i) lTimeInterval_THFTYPE_i).
% Axiom ax_106:((instance_THFTYPE_IIiioIioI before_THFTYPE_IiioI) lIrreflexiveRelation_THFTYPE_i).
% Axiom ax_107:((instance_THFTYPE_IIiooIioI holdsDuring_THFTYPE_IiooI) lAsymmetricRelation_THFTYPE_i).
% Axiom ax_108:(((domain_THFTYPE_IIiioIiioI brother_THFTYPE_IiioI) n2_THFTYPE_i) lHuman_THFTYPE_i).
% Axiom ax_109:((instance_THFTYPE_IIiioIioI brother_THFTYPE_IiioI) lTransitiveRelation_THFTYPE_i).
% Axiom ax_110:((instance_THFTYPE_IIIiioIIiioIoIioI subrelation_THFTYPE_IIiioIIiioIoI) lBinaryPredicate_THFTYPE_i).
% Axiom ax_111:(((domain_THFTYPE_IiiioI lEndFn_THFTYPE_i) n1_THFTYPE_i) lTimeInterval_THFTYPE_i).
% Axiom ax_112:(((domain_THFTYPE_IiiioI connected_THFTYPE_i) n1_THFTYPE_i) lObject_THFTYPE_i).
% Axiom ax_113:(((domain_THFTYPE_IiiioI greaterThan_THFTYPE_i) n1_THFTYPE_i) lQuantity_THFTYPE_i).
% Axiom ax_114:((instance_THFTYPE_IIiiIioI lWhenFn_THFTYPE_IiiI) lTotalValuedRelation_THFTYPE_i).
% Axiom ax_115:(((domain_THFTYPE_IIiioIiioI part_THFTYPE_IiioI) n1_THFTYPE_i) lObject_THFTYPE_i).
% Axiom ax_116:((subrelation_THFTYPE_IIiioIioI parent_THFTYPE_IiioI) familyRelat
% EOF
%------------------------------------------------------------------------------