\profile "Java Profile";
\settings {
"#Proof-Settings-Config-File
#Tue Jan 31 15:50:45 CET 2017
[StrategyProperty]VBT_PHASE=VBT_SYM_EX
[SMTSettings]useUninterpretedMultiplication=true
[SMTSettings]SelectedTaclets=
[StrategyProperty]METHOD_OPTIONS_KEY=METHOD_CONTRACT
[StrategyProperty]USER_TACLETS_OPTIONS_KEY3=USER_TACLETS_OFF
[StrategyProperty]SYMBOLIC_EXECUTION_ALIAS_CHECK_OPTIONS_KEY=SYMBOLIC_EXECUTION_ALIAS_CHECK_NEVER
[StrategyProperty]LOOP_OPTIONS_KEY=LOOP_INVARIANT
[StrategyProperty]USER_TACLETS_OPTIONS_KEY2=USER_TACLETS_OFF
[StrategyProperty]USER_TACLETS_OPTIONS_KEY1=USER_TACLETS_OFF
[StrategyProperty]QUANTIFIERS_OPTIONS_KEY=QUANTIFIERS_NON_SPLITTING_WITH_PROGS
[StrategyProperty]NON_LIN_ARITH_OPTIONS_KEY=NON_LIN_ARITH_NONE
[SMTSettings]instantiateHierarchyAssumptions=true
[StrategyProperty]AUTO_INDUCTION_OPTIONS_KEY=AUTO_INDUCTION_OFF
[StrategyProperty]DEP_OPTIONS_KEY=DEP_ON
[StrategyProperty]BLOCK_OPTIONS_KEY=BLOCK_CONTRACT
[StrategyProperty]CLASS_AXIOM_OPTIONS_KEY=CLASS_AXIOM_FREE
[StrategyProperty]SYMBOLIC_EXECUTION_NON_EXECUTION_BRANCH_HIDING_OPTIONS_KEY=SYMBOLIC_EXECUTION_NON_EXECUTION_BRANCH_HIDING_OFF
[StrategyProperty]QUERY_NEW_OPTIONS_KEY=QUERY_OFF
[Strategy]Timeout=-1
[Strategy]MaximumNumberOfAutomaticApplications=10000
[SMTSettings]integersMaximum=2147483645
[Choice]DefaultChoices=assertions-assertions\\:safe , initialisation-initialisation\\:disableStaticInitialisation , intRules-intRules\\:arithmeticSemanticsIgnoringOF , programRules-programRules\\:Java , runtimeExceptions-runtimeExceptions\\:ban , JavaCard-JavaCard\\:on , Strings-Strings\\:on , modelFields-modelFields\\:showSatisfiability , bigint-bigint\\:on , sequences-sequences\\:on , reach-reach\\:on , integerSimplificationRules-integerSimplificationRules\\:full , wdOperator-wdOperator\\:L , wdChecks-wdChecks\\:off , moreSeqRules-moreSeqRules\\:on , permissions-permissions\\:off , joinGenerateIsWeakeningGoal-joinGenerateIsWeakeningGoal\\:off
[SMTSettings]useConstantsForBigOrSmallIntegers=true
[StrategyProperty]STOPMODE_OPTIONS_KEY=STOPMODE_DEFAULT
[StrategyProperty]QUERYAXIOM_OPTIONS_KEY=QUERYAXIOM_ON
[StrategyProperty]INF_FLOW_CHECK_PROPERTY=INF_FLOW_CHECK_FALSE
[SMTSettings]maxGenericSorts=2
[SMTSettings]integersMinimum=-2147483645
[SMTSettings]invariantForall=false
[SMTSettings]UseBuiltUniqueness=false
[SMTSettings]explicitTypeHierarchy=false
[Strategy]ActiveStrategy=JavaCardDLStrategy
[StrategyProperty]SPLITTING_OPTIONS_KEY=SPLITTING_DELAYED
"
}
\javaSource "";
\proofObligation "#Proof Obligation Settings
#Tue Jan 31 15:50:45 CET 2017
name=SortPerm[SortPerm\\:\\:max(int)].JML normal_behavior operation contract.0
contract=SortPerm[SortPerm\\:\\:max(int)].JML normal_behavior operation contract.0
class=de.uka.ilkd.key.proof.init.FunctionalOperationContractPO
";
\proof {
(keyLog "0" (keyUser "pschmitt" ) (keyVersion "3b928241d3c6497f2bf3626bad48a3118b304db1"))
(autoModeTime "838")
(branch "dummy ID"
(builtin "One Step Simplification" (formula "1") (newnames "start,self,result,exc,heapAtPre,o,f"))
(rule "impRight" (formula "1"))
(rule "andLeft" (formula "1"))
(rule "andLeft" (formula "2"))
(rule "andLeft" (formula "1"))
(rule "andLeft" (formula "3"))
(rule "andLeft" (formula "1"))
(rule "andLeft" (formula "4"))
(rule "andLeft" (formula "1"))
(rule "andLeft" (formula "1"))
(rule "notLeft" (formula "2"))
(rule "eqSymm" (formula "10") (term "0,0,1,0,1"))
(rule "inEqSimp_ltToLeq" (formula "10") (term "1,0,1,0,0,0,1"))
(rule "polySimp_mulComm0" (formula "10") (term "1,0,0,1,0,1,0,0,0,1"))
(rule "polySimp_addComm1" (formula "10") (term "0,1,0,1,0,0,0,1"))
(rule "inEqSimp_ltToLeq" (formula "10") (term "1,0,0,0,0,0,0,1"))
(rule "polySimp_mulComm0" (formula "10") (term "1,0,0,1,0,0,0,0,0,0,1"))
(rule "inEqSimp_ltToLeq" (formula "7"))
(rule "polySimp_mulComm0" (formula "7") (term "1,0,0"))
(rule "polySimp_addComm1" (formula "7") (term "0"))
(rule "inEqSimp_gtToGeq" (formula "5"))
(rule "times_zero_1" (formula "5") (term "1,0,0"))
(rule "add_zero_right" (formula "5") (term "0,0"))
(rule "inEqSimp_commuteGeq" (formula "10") (term "1,0,0,0,0,0,1"))
(rule "inEqSimp_commuteLeq" (formula "10") (term "0,0,0,0,0,0,0,1"))
(rule "inEqSimp_commuteLeq" (formula "6"))
(rule "assignment" (formula "10") (term "1"))
(builtin "One Step Simplification" (formula "10"))
(rule "inEqSimp_sepNegMonomial0" (formula "7"))
(rule "polySimp_mulLiterals" (formula "7") (term "0"))
(rule "polySimp_elimOne" (formula "7") (term "0"))
(rule "inEqSimp_sepPosMonomial1" (formula "5"))
(rule "mul_literals" (formula "5") (term "1"))
(rule "inEqSimp_sepPosMonomial0" (formula "10") (term "1,0,0,0,0,0,0,1"))
(rule "polySimp_mulComm0" (formula "10") (term "1,1,0,0,0,0,0,0,1"))
(rule "polySimp_rightDist" (formula "10") (term "1,1,0,0,0,0,0,0,1"))
(rule "mul_literals" (formula "10") (term "0,1,1,0,0,0,0,0,0,1"))
(rule "polySimp_mulLiterals" (formula "10") (term "1,1,1,0,0,0,0,0,0,1"))
(rule "polySimp_elimOne" (formula "10") (term "1,1,1,0,0,0,0,0,0,1"))
(rule "inEqSimp_sepNegMonomial0" (formula "10") (term "1,0,1,0,0,0,1"))
(rule "polySimp_mulLiterals" (formula "10") (term "0,1,0,1,0,0,0,1"))
(rule "polySimp_elimOne" (formula "10") (term "0,1,0,1,0,0,0,1"))
(rule "nnf_imp2or" (formula "10") (term "0,0,0,0,0,1"))
(rule "nnf_notAnd" (formula "10") (term "0,0,0,0,0,0,1"))
(rule "inEqSimp_notGeq" (formula "10") (term "0,0,0,0,0,0,0,1"))
(rule "polySimp_mulComm0" (formula "10") (term "1,0,0,0,0,0,0,0,0,0,1"))
(rule "inEqSimp_sepPosMonomial0" (formula "10") (term "0,0,0,0,0,0,0,1"))
(rule "polySimp_mulComm0" (formula "10") (term "1,0,0,0,0,0,0,0,1"))
(rule "polySimp_rightDist" (formula "10") (term "1,0,0,0,0,0,0,0,1"))
(rule "polySimp_mulLiterals" (formula "10") (term "1,1,0,0,0,0,0,0,0,1"))
(rule "mul_literals" (formula "10") (term "0,1,0,0,0,0,0,0,0,1"))
(rule "polySimp_elimOne" (formula "10") (term "1,1,0,0,0,0,0,0,0,1"))
(rule "inEqSimp_notLeq" (formula "10") (term "1,0,0,0,0,0,0,1"))
(rule "polySimp_rightDist" (formula "10") (term "1,0,0,1,0,0,0,0,0,0,1"))
(rule "mul_literals" (formula "10") (term "0,1,0,0,1,0,0,0,0,0,0,1"))
(rule "polySimp_addAssoc" (formula "10") (term "0,0,1,0,0,0,0,0,0,1"))
(rule "add_literals" (formula "10") (term "0,0,0,1,0,0,0,0,0,0,1"))
(rule "add_zero_left" (formula "10") (term "0,0,1,0,0,0,0,0,0,1"))
(rule "inEqSimp_sepPosMonomial1" (formula "10") (term "1,0,0,0,0,0,0,1"))
(rule "polySimp_mulLiterals" (formula "10") (term "1,1,0,0,0,0,0,0,1"))
(rule "polySimp_elimOne" (formula "10") (term "1,1,0,0,0,0,0,0,1"))
(rule "Class_invariant_axiom_for_SortPerm" (formula "8") (inst "sk=sk_0") (ifseqformula "3"))
(branch "Use Axiom"
(rule "notLeft" (formula "8"))
(rule "methodBodyExpand" (formula "10") (term "1") (newnames "heapBefore_max,savedHeapBefore_max,_startBefore_max"))
(builtin "One Step Simplification" (formula "10"))
(rule "variableDeclarationAssign" (formula "10") (term "1"))
(rule "variableDeclaration" (formula "10") (term "1") (newnames "counter"))
(rule "assignment" (formula "10") (term "1"))
(builtin "One Step Simplification" (formula "10"))
(rule "variableDeclarationAssign" (formula "10") (term "1"))
(rule "variableDeclaration" (formula "10") (term "1") (newnames "idx"))
(rule "assignment" (formula "10") (term "1"))
(builtin "One Step Simplification" (formula "10"))
(builtin "Loop Invariant" (formula "10") (newnames "variant,b,heapBefore_LOOP,counterBefore_LOOP,idxBefore_LOOP,counter_0,idx_0,heap_After_LOOP,anon_heap_LOOP,o,f"))
(branch "Invariant Initially Valid"
(builtin "One Step Simplification" (formula "10") (ifInst "" (formula "1")))
(rule "inEqSimp_ltToLeq" (formula "10") (term "1,0,0,1"))
(rule "polySimp_mulComm0" (formula "10") (term "1,0,0,1,0,0,1"))
(rule "inEqSimp_ltToLeq" (formula "10") (term "1,0"))
(rule "polySimp_mulComm0" (formula "10") (term "1,0,0,1,0"))
(rule "polySimp_addComm1" (formula "10") (term "0,1,0"))
(rule "inEqSimp_commuteLeq" (formula "10") (term "1,0,0,0"))
(rule "inEqSimp_commuteGeq" (formula "10") (term "1,0,1"))
(rule "inEqSimp_homoInEq0" (formula "10") (term "1,0,0"))
(rule "polySimp_pullOutFactor1" (formula "10") (term "0,1,0,0"))
(rule "add_literals" (formula "10") (term "1,0,1,0,0"))
(rule "times_zero_1" (formula "10") (term "0,1,0,0"))
(rule "qeq_literals" (formula "10") (term "1,0,0"))
(builtin "One Step Simplification" (formula "10"))
(rule "inEqSimp_homoInEq0" (formula "10") (term "0,0,0"))
(rule "polySimp_pullOutFactor1" (formula "10") (term "0,0,0,0"))
(rule "add_literals" (formula "10") (term "1,0,0,0,0"))
(rule "times_zero_1" (formula "10") (term "0,0,0,0"))
(rule "qeq_literals" (formula "10") (term "0,0,0"))
(builtin "One Step Simplification" (formula "10"))
(rule "inEqSimp_sepPosMonomial0" (formula "10") (term "1,0,0,1"))
(rule "polySimp_mulComm0" (formula "10") (term "1,1,0,0,1"))
(rule "polySimp_rightDist" (formula "10") (term "1,1,0,0,1"))
(rule "mul_literals" (formula "10") (term "0,1,1,0,0,1"))
(rule "polySimp_mulLiterals" (formula "10") (term "1,1,1,0,0,1"))
(rule "polySimp_elimOne" (formula "10") (term "1,1,1,0,0,1"))
(rule "inEqSimp_sepNegMonomial0" (formula "10") (term "1,0"))
(rule "polySimp_mulLiterals" (formula "10") (term "0,1,0"))
(rule "polySimp_elimOne" (formula "10") (term "0,1,0"))
(rule "replace_known_left" (formula "10") (term "1,0") (ifseqformula "7"))
(builtin "One Step Simplification" (formula "10"))
(rule "inEqSimp_subsumption1" (formula "10") (term "0") (ifseqformula "7"))
(rule "inEqSimp_homoInEq0" (formula "10") (term "0,0"))
(rule "polySimp_pullOutFactor1b" (formula "10") (term "0,0,0"))
(rule "add_literals" (formula "10") (term "1,1,0,0,0"))
(rule "times_zero_1" (formula "10") (term "1,0,0,0"))
(rule "add_zero_right" (formula "10") (term "0,0,0"))
(rule "qeq_literals" (formula "10") (term "0,0"))
(builtin "One Step Simplification" (formula "10"))
(rule "allRight" (formula "10") (inst "sk=x_11"))
(rule "impRight" (formula "10"))
(rule "andLeft" (formula "1"))
(rule "inEqSimp_leqRight" (formula "12"))
(rule "polySimp_mulComm0" (formula "1") (term "1,0,0"))
(rule "inEqSimp_sepPosMonomial1" (formula "1"))
(rule "polySimp_mulComm0" (formula "1") (term "1"))
(rule "polySimp_rightDist" (formula "1") (term "1"))
(rule "mul_literals" (formula "1") (term "0,1"))
(rule "polySimp_mulLiterals" (formula "1") (term "1,1"))
(rule "polySimp_elimOne" (formula "1") (term "1,1"))
(rule "inEqSimp_contradInEq0" (formula "2") (ifseqformula "3"))
(rule "andLeft" (formula "2"))
(rule "inEqSimp_homoInEq1" (formula "2"))
(rule "polySimp_mulComm0" (formula "2") (term "1,0"))
(rule "polySimp_rightDist" (formula "2") (term "1,0"))
(rule "mul_literals" (formula "2") (term "0,1,0"))
(rule "polySimp_addAssoc" (formula "2") (term "0"))
(rule "polySimp_addComm0" (formula "2") (term "0,0"))
(rule "polySimp_pullOutFactor1b" (formula "2") (term "0"))
(rule "add_literals" (formula "2") (term "1,1,0"))
(rule "times_zero_1" (formula "2") (term "1,0"))
(rule "add_zero_right" (formula "2") (term "0"))
(rule "leq_literals" (formula "2"))
(rule "closeFalse" (formula "2"))
)
(branch "Body Preserves Invariant"
(builtin "One Step Simplification" (formula "9"))
(builtin "One Step Simplification" (formula "12"))
(rule "translateJavaSubInt" (formula "12") (term "0,1,1,1,0,1"))
(rule "translateJavaSubInt" (formula "12") (term "0,1,1,1,0,1,1"))
(rule "andLeft" (formula "9"))
(rule "impRight" (formula "13"))
(rule "andLeft" (formula "10"))
(rule "andLeft" (formula "10"))
(rule "andLeft" (formula "10"))
(rule "andLeft" (formula "10"))
(rule "eqSymm" (formula "18") (term "0,0,1,0,1,1,0,1"))
(rule "polySimp_elimSub" (formula "18") (term "0,1,1,1,0"))
(rule "polySimp_elimSub" (formula "18") (term "0,1,1,1,0,1"))
(rule "polySimp_addComm0" (formula "18") (term "0,1,1,1,0"))
(rule "polySimp_addComm0" (formula "18") (term "0,1,1,1,0,1"))
(rule "inEqSimp_ltToLeq" (formula "15") (term "1,0,0"))
(rule "polySimp_mulComm0" (formula "15") (term "1,0,0,1,0,0"))
(rule "inEqSimp_ltToLeq" (formula "18") (term "1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_mulComm0" (formula "18") (term "1,0,0,1,0,0,1,0,0,1,1,0,1"))
(rule "inEqSimp_ltToLeq" (formula "18") (term "1,0,0,0,1,1,0,1"))
(rule "polySimp_mulComm0" (formula "18") (term "1,0,0,1,0,0,0,1,1,0,1"))
(rule "polySimp_addComm1" (formula "18") (term "0,1,0,0,0,1,1,0,1"))
(rule "inEqSimp_ltToLeq" (formula "18") (term "1,0,0,0,0,1,1,0,1"))
(rule "polySimp_mulComm0" (formula "18") (term "1,0,0,1,0,0,0,0,1,1,0,1"))
(rule "polySimp_addComm1" (formula "18") (term "0,1,0,0,0,0,1,1,0,1"))
(rule "inEqSimp_ltToLeq" (formula "14"))
(rule "polySimp_mulComm0" (formula "14") (term "1,0,0"))
(rule "polySimp_addComm1" (formula "14") (term "0"))
(rule "inEqSimp_ltToLeq" (formula "13"))
(rule "polySimp_mulComm0" (formula "13") (term "1,0,0"))
(rule "polySimp_addComm1" (formula "13") (term "0"))
(rule "inEqSimp_commuteGeq" (formula "15") (term "1,0"))
(rule "inEqSimp_commuteLeq" (formula "18") (term "1,0,0,0,0,0,0,1,1,0,1"))
(rule "inEqSimp_commuteGeq" (formula "18") (term "1,0,1,0,0,1,1,0,1"))
(rule "inEqSimp_commuteLeq" (formula "18") (term "0,0,0,0,0,0,0,1,1,0,1"))
(rule "inEqSimp_commuteLeq" (formula "18") (term "1,0,0,0,0,0,1,1,0,1"))
(rule "inEqSimp_commuteLeq" (formula "11"))
(rule "variableDeclarationAssign" (formula "1") (term "1"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "1") (term "1") (newnames "b_2"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "exc_1"))
(rule "assignment" (formula "18") (term "1"))
(builtin "One Step Simplification" (formula "18"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "thrownExc"))
(rule "blockThrow" (formula "18") (term "1,0,0,1"))
(rule "inEqSimp_sepPosMonomial0" (formula "15") (term "1,0,0"))
(rule "polySimp_mulComm0" (formula "15") (term "1,1,0,0"))
(rule "polySimp_rightDist" (formula "15") (term "1,1,0,0"))
(rule "mul_literals" (formula "15") (term "0,1,1,0,0"))
(rule "polySimp_mulLiterals" (formula "15") (term "1,1,1,0,0"))
(rule "polySimp_elimOne" (formula "15") (term "1,1,1,0,0"))
(rule "inEqSimp_sepNegMonomial0" (formula "14"))
(rule "polySimp_mulLiterals" (formula "14") (term "0"))
(rule "polySimp_elimOne" (formula "14") (term "0"))
(rule "inEqSimp_sepNegMonomial0" (formula "13"))
(rule "polySimp_mulLiterals" (formula "13") (term "0"))
(rule "polySimp_elimOne" (formula "13") (term "0"))
(rule "inEqSimp_sepNegMonomial0" (formula "17") (term "1,0,0,0,0,1,1,0,1"))
(rule "polySimp_mulLiterals" (formula "17") (term "0,1,0,0,0,0,1,1,0,1"))
(rule "polySimp_elimOne" (formula "17") (term "0,1,0,0,0,0,1,1,0,1"))
(rule "inEqSimp_sepNegMonomial0" (formula "17") (term "1,0,0,0,1,1,0,1"))
(rule "polySimp_mulLiterals" (formula "17") (term "0,1,0,0,0,1,1,0,1"))
(rule "polySimp_elimOne" (formula "17") (term "0,1,0,0,0,1,1,0,1"))
(rule "inEqSimp_sepPosMonomial0" (formula "17") (term "1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_mulComm0" (formula "17") (term "1,1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_rightDist" (formula "17") (term "1,1,0,0,1,0,0,1,1,0,1"))
(rule "mul_literals" (formula "17") (term "0,1,1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_mulLiterals" (formula "17") (term "1,1,1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_elimOne" (formula "17") (term "1,1,1,0,0,1,0,0,1,1,0,1"))
(rule "inEqSimp_exactShadow3" (formula "7") (ifseqformula "12"))
(rule "times_zero_1" (formula "7") (term "0,0"))
(rule "add_zero_left" (formula "7") (term "0"))
(rule "inEqSimp_exactShadow3" (formula "8") (ifseqformula "11"))
(rule "mul_literals" (formula "8") (term "0,0"))
(rule "add_zero_left" (formula "8") (term "0"))
(rule "boxToDiamond" (formula "1") (term "1"))
(builtin "One Step Simplification" (formula "1"))
(rule "notLeft" (formula "1"))
(rule "nnf_imp2or" (formula "15") (term "0"))
(rule "nnf_notAnd" (formula "15") (term "0,0"))
(rule "inEqSimp_notLeq" (formula "15") (term "1,0,0"))
(rule "polySimp_rightDist" (formula "15") (term "1,0,0,1,0,0"))
(rule "mul_literals" (formula "15") (term "0,1,0,0,1,0,0"))
(rule "polySimp_addAssoc" (formula "15") (term "0,0,1,0,0"))
(rule "add_literals" (formula "15") (term "0,0,0,1,0,0"))
(rule "add_zero_left" (formula "15") (term "0,0,1,0,0"))
(rule "inEqSimp_sepPosMonomial1" (formula "15") (term "1,0,0"))
(rule "polySimp_mulLiterals" (formula "15") (term "1,1,0,0"))
(rule "polySimp_elimOne" (formula "15") (term "1,1,0,0"))
(rule "inEqSimp_notGeq" (formula "15") (term "0,0,0"))
(rule "polySimp_mulComm0" (formula "15") (term "1,0,0,0,0,0"))
(rule "inEqSimp_sepPosMonomial0" (formula "15") (term "0,0,0"))
(rule "polySimp_mulComm0" (formula "15") (term "1,0,0,0"))
(rule "polySimp_rightDist" (formula "15") (term "1,0,0,0"))
(rule "mul_literals" (formula "15") (term "0,1,0,0,0"))
(rule "polySimp_mulLiterals" (formula "15") (term "1,1,0,0,0"))
(rule "polySimp_elimOne" (formula "15") (term "1,1,0,0,0"))
(rule "nnf_imp2or" (formula "19") (term "0,1,0,0,1,1,0,1"))
(rule "nnf_notAnd" (formula "19") (term "0,0,1,0,0,1,1,0,1"))
(rule "inEqSimp_notLeq" (formula "19") (term "1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_rightDist" (formula "19") (term "1,0,0,1,0,0,1,0,0,1,1,0,1"))
(rule "mul_literals" (formula "19") (term "0,1,0,0,1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_addAssoc" (formula "19") (term "0,0,1,0,0,1,0,0,1,1,0,1"))
(rule "add_literals" (formula "19") (term "0,0,0,1,0,0,1,0,0,1,1,0,1"))
(rule "add_zero_left" (formula "19") (term "0,0,1,0,0,1,0,0,1,1,0,1"))
(rule "inEqSimp_sepPosMonomial1" (formula "19") (term "1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_mulLiterals" (formula "19") (term "1,1,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_elimOne" (formula "19") (term "1,1,0,0,1,0,0,1,1,0,1"))
(rule "inEqSimp_notGeq" (formula "19") (term "0,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_mulComm0" (formula "19") (term "1,0,0,0,0,0,1,0,0,1,1,0,1"))
(rule "inEqSimp_sepPosMonomial0" (formula "19") (term "0,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_mulComm0" (formula "19") (term "1,0,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_rightDist" (formula "19") (term "1,0,0,0,1,0,0,1,1,0,1"))
(rule "mul_literals" (formula "19") (term "0,1,0,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_mulLiterals" (formula "19") (term "1,1,0,0,0,1,0,0,1,1,0,1"))
(rule "polySimp_elimOne" (formula "19") (term "1,1,0,0,0,1,0,0,1,1,0,1"))
(rule "commute_or" (formula "15") (term "0,0"))
(rule "compound_less_than_comparison_2" (formula "16") (term "1") (inst "#v1=x_1") (inst "#v0=x"))
(rule "variableDeclarationAssign" (formula "16") (term "1"))
(rule "variableDeclaration" (formula "16") (term "1") (newnames "x_2"))
(rule "assignment" (formula "16") (term "1"))
(builtin "One Step Simplification" (formula "16"))
(rule "variableDeclarationAssign" (formula "16") (term "1"))
(rule "variableDeclaration" (formula "16") (term "1") (newnames "x_3"))
(rule "eval_order_access2" (formula "16") (term "1") (inst "#v0=x_arr"))
(rule "variableDeclarationAssign" (formula "16") (term "1"))
(rule "variableDeclaration" (formula "16") (term "1") (newnames "x_arr_1"))
(rule "assignment_read_attribute_this" (formula "16"))
(builtin "One Step Simplification" (formula "16"))
(rule "assignment_read_length" (formula "16"))
(branch "Normal Execution (x_arr_1 != null)"
(builtin "One Step Simplification" (formula "16"))
(rule "less_than_comparison_simple" (formula "16") (term "1"))
(builtin "One Step Simplification" (formula "16"))
(rule "inEqSimp_ltToLeq" (formula "16") (term "0,0,0"))
(rule "polySimp_mulComm0" (formula "16") (term "1,0,0,0,0,0"))
(rule "polySimp_addComm1" (formula "16") (term "0,0,0,0"))
(rule "inEqSimp_sepNegMonomial0" (formula "16") (term "0,0,0"))
(rule "polySimp_mulLiterals" (formula "16") (term "0,0,0,0"))
(rule "polySimp_elimOne" (formula "16") (term "0,0,0,0"))
(rule "methodCallEmpty" (formula "16") (term "1"))
(rule "emptyModality" (formula "16") (term "1"))
(builtin "One Step Simplification" (formula "16"))
(rule "notRight" (formula "16"))
(rule "inEqSimp_subsumption1" (formula "13") (ifseqformula "1"))
(rule "inEqSimp_homoInEq0" (formula "13") (term "0"))
(rule "polySimp_pullOutFactor1b" (formula "13") (term "0,0"))
(rule "add_literals" (formula "13") (term "1,1,0,0"))
(rule "times_zero_1" (formula "13") (term "1,0,0"))
(rule "add_literals" (formula "13") (term "0,0"))
(rule "qeq_literals" (formula "13") (term "0"))
(builtin "One Step Simplification" (formula "13"))
(rule "true_left" (formula "13"))
(rule "arrayLengthIsAShort" (formula "10") (term "0"))
(builtin "One Step Simplification" (formula "10"))
(rule "true_left" (formula "10"))
(rule "arrayLengthNotNegative" (formula "10") (term "0"))
(rule "inEqSimp_subsumption1" (formula "10") (ifseqformula "6"))
(rule "leq_literals" (formula "10") (term "0"))
(builtin "One Step Simplification" (formula "10"))
(rule "true_left" (formula "10"))
(rule "ifUnfold" (formula "18") (term "1") (inst "#boolv=x"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_4"))
(rule "compound_less_than_comparison_2" (formula "18") (term "1") (inst "#v1=x_6") (inst "#v0=x_5"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_5"))
(rule "assignment" (formula "18") (term "1"))
(builtin "One Step Simplification" (formula "18"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_6"))
(rule "eval_order_array_access6" (formula "18") (term "1") (inst "#v0=x_arr"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_arr_2"))
(rule "assignment_read_attribute_this" (formula "18"))
(builtin "One Step Simplification" (formula "18"))
(rule "assignment_read_length" (formula "18"))
(branch "Normal Execution (x_arr_2 != null)"
(builtin "One Step Simplification" (formula "18"))
(rule "less_than_comparison_simple" (formula "18") (term "1"))
(builtin "One Step Simplification" (formula "18"))
(rule "inEqSimp_ltToLeq" (formula "18") (term "0,0,1,0"))
(rule "polySimp_mulComm0" (formula "18") (term "1,0,0,0,0,1,0"))
(rule "polySimp_addComm1" (formula "18") (term "0,0,0,1,0"))
(rule "inEqSimp_sepNegMonomial0" (formula "18") (term "0,0,1,0"))
(rule "polySimp_mulLiterals" (formula "18") (term "0,0,0,1,0"))
(rule "polySimp_elimOne" (formula "18") (term "0,0,0,1,0"))
(rule "replace_known_left" (formula "18") (term "0,0,1,0") (ifseqformula "1"))
(builtin "One Step Simplification" (formula "18"))
(rule "ifSplit" (formula "18"))
(branch "if x_4 true"
(builtin "One Step Simplification" (formula "19"))
(builtin "One Step Simplification" (formula "1"))
(rule "true_left" (formula "1"))
(rule "ifUnfold" (formula "18") (term "1") (inst "#boolv=x"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_7"))
(rule "compound_greater_than_comparison_2" (formula "18") (term "1") (inst "#v1=x_9") (inst "#v0=x_8"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_8"))
(rule "eval_order_array_access4" (formula "18") (term "1") (inst "#v0=x_arr"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_arr_3"))
(rule "assignment_read_attribute_this" (formula "18"))
(builtin "One Step Simplification" (formula "18"))
(rule "assignment_array2" (formula "18"))
(branch "Normal Execution (x_arr_3 != null)"
(builtin "One Step Simplification" (formula "18"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_9"))
(rule "eval_order_array_access4" (formula "18") (term "1") (inst "#v0=x_arr"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_arr_4"))
(rule "assignment_read_attribute_this" (formula "18"))
(builtin "One Step Simplification" (formula "18"))
(rule "assignment_array2" (formula "18"))
(branch "Normal Execution (x_arr_4 != null)"
(builtin "One Step Simplification" (formula "18"))
(rule "greater_than_comparison_simple" (formula "18") (term "1"))
(builtin "One Step Simplification" (formula "18"))
(rule "inEqSimp_gtToGeq" (formula "18") (term "0,0,1,0"))
(rule "polySimp_mulComm0" (formula "18") (term "1,0,0,0,0,1,0"))
(rule "polySimp_addComm1" (formula "18") (term "0,0,0,1,0"))
(rule "inEqSimp_sepNegMonomial1" (formula "18") (term "0,0,1,0"))
(rule "polySimp_mulLiterals" (formula "18") (term "0,0,0,1,0"))
(rule "polySimp_elimOne" (formula "18") (term "0,0,0,1,0"))
(rule "onlyCreatedObjectsAreReferenced" (formula "6") (term "0,0") (ifseqformula "2"))
(rule "replace_known_right" (formula "6") (term "0") (ifseqformula "17"))
(builtin "One Step Simplification" (formula "6"))
(rule "ifSplit" (formula "19"))
(branch "if x_7 true"
(builtin "One Step Simplification" (formula "20"))
(builtin "One Step Simplification" (formula "1"))
(rule "assignment" (formula "20") (term "1"))
(builtin "One Step Simplification" (formula "20"))
(rule "assignmentAdditionInt" (formula "20") (term "1"))
(builtin "One Step Simplification" (formula "20"))
(rule "translateJavaAddInt" (formula "20") (term "0,1,0"))
(rule "polySimp_addComm0" (formula "20") (term "0,1,0"))
(rule "tryEmpty" (formula "20") (term "1"))
(rule "methodCallEmpty" (formula "20") (term "1"))
(rule "emptyModality" (formula "20") (term "1"))
(builtin "One Step Simplification" (formula "20") (ifInst "" (formula "2")) (ifInst "" (formula "2")) (ifInst "" (formula "12")))
(rule "polySimp_mulComm0" (formula "20") (term "0,0,1"))
(rule "polySimp_rightDist" (formula "20") (term "0,0,1"))
(rule "mul_literals" (formula "20") (term "0,0,0,1"))
(rule "precOfInt" (formula "20") (term "1"))
(rule "inEqSimp_ltToLeq" (formula "20") (term "1,1"))
(rule "polySimp_rightDist" (formula "20") (term "1,0,0,1,1"))
(rule "polySimp_mulAssoc" (formula "20") (term "0,1,0,0,1,1"))
(rule "polySimp_mulComm0" (formula "20") (term "0,0,1,0,0,1,1"))
(rule "polySimp_mulLiterals" (formula "20") (term "0,1,0,0,1,1"))
(rule "polySimp_elimOne" (formula "20") (term "0,1,0,0,1,1"))
(rule "polySimp_addAssoc" (formula "20") (term "0,0,1,1"))
(rule "polySimp_addAssoc" (formula "20") (term "0,1,1"))
(rule "polySimp_addComm1" (formula "20") (term "0,0,1,1"))
(rule "polySimp_pullOutFactor2b" (formula "20") (term "0,1,1"))
(rule "add_literals" (formula "20") (term "1,1,0,1,1"))
(rule "times_zero_1" (formula "20") (term "1,0,1,1"))
(rule "add_zero_right" (formula "20") (term "0,1,1"))
(rule "polySimp_addAssoc" (formula "20") (term "0,1,1"))
(rule "polySimp_addComm1" (formula "20") (term "0,0,1,1"))
(rule "add_literals" (formula "20") (term "0,0,0,1,1"))
(rule "add_zero_left" (formula "20") (term "0,0,1,1"))
(rule "polySimp_pullOutFactor1" (formula "20") (term "0,1,1"))
(rule "add_literals" (formula "20") (term "1,0,1,1"))
(rule "times_zero_1" (formula "20") (term "0,1,1"))
(rule "leq_literals" (formula "20") (term "1,1"))
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_commuteGeq" (formula "20") (term "1,0,0"))
(rule "replace_known_left" (formula "20") (term "1,0,0") (ifseqformula "14"))
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_commuteGeq" (formula "20") (term "0,0"))
(rule "inEqSimp_homoInEq0" (formula "20") (term "1"))
(rule "mul_literals" (formula "20") (term "1,0,1"))
(rule "add_zero_right" (formula "20") (term "0,1"))
(rule "inEqSimp_sepPosMonomial1" (formula "20") (term "1"))
(rule "polySimp_mulComm0" (formula "20") (term "1,1"))
(rule "polySimp_rightDist" (formula "20") (term "1,1"))
(rule "mul_literals" (formula "20") (term "0,1,1"))
(rule "polySimp_mulLiterals" (formula "20") (term "1,1,1"))
(rule "polySimp_elimOne" (formula "20") (term "1,1,1"))
(rule "replace_known_left" (formula "20") (term "1") (ifseqformula "2"))
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_subsumption0" (formula "20") (term "0") (ifseqformula "14"))
(rule "inEqSimp_homoInEq0" (formula "20") (term "0,0"))
(rule "polySimp_pullOutFactor1b" (formula "20") (term "0,0,0"))
(rule "add_literals" (formula "20") (term "1,1,0,0,0"))
(rule "times_zero_1" (formula "20") (term "1,0,0,0"))
(rule "add_literals" (formula "20") (term "0,0,0"))
(rule "qeq_literals" (formula "20") (term "0,0"))
(builtin "One Step Simplification" (formula "20"))
(rule "allRight" (formula "20") (inst "sk=x_10"))
(rule "orRight" (formula "20"))
(rule "orRight" (formula "20"))
(rule "inEqSimp_leqRight" (formula "22"))
(rule "polySimp_mulComm0" (formula "1") (term "1,0,0"))
(rule "inEqSimp_leqRight" (formula "21"))
(rule "polySimp_rightDist" (formula "1") (term "1,0,0"))
(rule "mul_literals" (formula "1") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "1") (term "0,0"))
(rule "add_literals" (formula "1") (term "0,0,0"))
(rule "add_zero_left" (formula "1") (term "0,0"))
(rule "inEqSimp_geqRight" (formula "22"))
(rule "polySimp_rightDist" (formula "1") (term "1,0,0"))
(rule "mul_literals" (formula "1") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "1") (term "0,0"))
(rule "add_literals" (formula "1") (term "0,0,0"))
(rule "add_zero_left" (formula "1") (term "0,0"))
(rule "inEqSimp_sepPosMonomial1" (formula "3"))
(rule "polySimp_mulComm0" (formula "3") (term "1"))
(rule "polySimp_rightDist" (formula "3") (term "1"))
(rule "polySimp_mulLiterals" (formula "3") (term "1,1"))
(rule "mul_literals" (formula "3") (term "0,1"))
(rule "polySimp_elimOne" (formula "3") (term "1,1"))
(rule "inEqSimp_sepPosMonomial1" (formula "2"))
(rule "polySimp_mulLiterals" (formula "2") (term "1"))
(rule "polySimp_elimOne" (formula "2") (term "1"))
(rule "inEqSimp_sepPosMonomial0" (formula "1"))
(rule "polySimp_mulLiterals" (formula "1") (term "1"))
(rule "polySimp_elimOne" (formula "1") (term "1"))
(rule "inEqSimp_exactShadow3" (formula "2") (ifseqformula "1"))
(rule "polySimp_mulComm0" (formula "2") (term "0,0"))
(rule "polySimp_addComm0" (formula "2") (term "0"))
(rule "inEqSimp_sepNegMonomial1" (formula "2"))
(rule "polySimp_mulLiterals" (formula "2") (term "0"))
(rule "polySimp_elimOne" (formula "2") (term "0"))
(rule "allLeft" (formula "20") (inst "t=x_10"))
(rule "inEqSimp_contradInEq1" (formula "20") (term "1,0") (ifseqformula "2"))
(rule "inEqSimp_homoInEq1" (formula "20") (term "0,1,0"))
(rule "polySimp_mulComm0" (formula "20") (term "1,0,0,1,0"))
(rule "polySimp_rightDist" (formula "20") (term "1,0,0,1,0"))
(rule "mul_literals" (formula "20") (term "0,1,0,0,1,0"))
(rule "polySimp_addAssoc" (formula "20") (term "0,0,1,0"))
(rule "polySimp_addComm0" (formula "20") (term "0,0,0,1,0"))
(rule "polySimp_pullOutFactor1b" (formula "20") (term "0,0,1,0"))
(rule "add_literals" (formula "20") (term "1,1,0,0,1,0"))
(rule "times_zero_1" (formula "20") (term "1,0,0,1,0"))
(rule "add_zero_right" (formula "20") (term "0,0,1,0"))
(rule "leq_literals" (formula "20") (term "0,1,0"))
(builtin "One Step Simplification" (formula "20"))
(rule "cut_direct" (formula "20") (term "0"))
(branch "CUT: x_10 >= counter_0 TRUE"
(builtin "One Step Simplification" (formula "21"))
(rule "true_left" (formula "21"))
(rule "inEqSimp_antiSymm" (formula "20") (ifseqformula "1"))
(rule "applyEqRigid" (formula "21") (term "0") (ifseqformula "20"))
(rule "inEqSimp_homoInEq1" (formula "21"))
(rule "polySimp_pullOutFactor1" (formula "21") (term "0"))
(rule "add_literals" (formula "21") (term "1,0"))
(rule "times_zero_1" (formula "21") (term "0"))
(rule "leq_literals" (formula "21"))
(rule "true_left" (formula "21"))
(rule "applyEqRigid" (formula "1") (term "0") (ifseqformula "20"))
(rule "inEqSimp_homoInEq0" (formula "1"))
(rule "polySimp_pullOutFactor1" (formula "1") (term "0"))
(rule "add_literals" (formula "1") (term "1,0"))
(rule "times_zero_1" (formula "1") (term "0"))
(rule "qeq_literals" (formula "1"))
(rule "true_left" (formula "1"))
(rule "applyEq" (formula "1") (term "0") (ifseqformula "19"))
(rule "inEqSimp_commuteGeq" (formula "1"))
(rule "applyEqRigid" (formula "1") (term "0,2,0") (ifseqformula "18"))
(rule "inEqSimp_homoInEq1" (formula "1"))
(rule "polySimp_pullOutFactor1b" (formula "1") (term "0"))
(rule "add_literals" (formula "1") (term "1,1,0"))
(rule "times_zero_1" (formula "1") (term "1,0"))
(rule "add_zero_right" (formula "1") (term "0"))
(rule "leq_literals" (formula "1"))
(rule "closeFalse" (formula "1"))
)
(branch "CUT: x_10 >= counter_0 FALSE"
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_geqRight" (formula "22"))
(rule "polySimp_mulComm0" (formula "1") (term "1,0,0"))
(rule "inEqSimp_sepPosMonomial0" (formula "1"))
(rule "polySimp_mulComm0" (formula "1") (term "1"))
(rule "polySimp_rightDist" (formula "1") (term "1"))
(rule "polySimp_mulLiterals" (formula "1") (term "1,1"))
(rule "mul_literals" (formula "1") (term "0,1"))
(rule "polySimp_elimOne" (formula "1") (term "1,1"))
(rule "inEqSimp_subsumption0" (formula "2") (ifseqformula "1"))
(rule "inEqSimp_homoInEq0" (formula "2") (term "0"))
(rule "polySimp_mulComm0" (formula "2") (term "1,0,0"))
(rule "polySimp_rightDist" (formula "2") (term "1,0,0"))
(rule "mul_literals" (formula "2") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "2") (term "0,0"))
(rule "polySimp_addComm0" (formula "2") (term "0,0,0"))
(rule "polySimp_pullOutFactor1b" (formula "2") (term "0,0"))
(rule "add_literals" (formula "2") (term "1,1,0,0"))
(rule "times_zero_1" (formula "2") (term "1,0,0"))
(rule "add_zero_right" (formula "2") (term "0,0"))
(rule "qeq_literals" (formula "2") (term "0"))
(builtin "One Step Simplification" (formula "2"))
(rule "true_left" (formula "2"))
(rule "inEqSimp_exactShadow3" (formula "2") (ifseqformula "1"))
(rule "polySimp_mulComm0" (formula "2") (term "0,0"))
(rule "polySimp_addComm0" (formula "2") (term "0"))
(rule "inEqSimp_sepNegMonomial1" (formula "2"))
(rule "polySimp_mulLiterals" (formula "2") (term "0"))
(rule "polySimp_elimOne" (formula "2") (term "0"))
(rule "inEqSimp_subsumption0" (formula "18") (ifseqformula "2"))
(rule "inEqSimp_homoInEq0" (formula "18") (term "0"))
(rule "polySimp_mulComm0" (formula "18") (term "1,0,0"))
(rule "polySimp_rightDist" (formula "18") (term "1,0,0"))
(rule "mul_literals" (formula "18") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "18") (term "0,0"))
(rule "polySimp_addComm0" (formula "18") (term "0,0,0"))
(rule "polySimp_pullOutFactor1b" (formula "18") (term "0,0"))
(rule "add_literals" (formula "18") (term "1,1,0,0"))
(rule "times_zero_1" (formula "18") (term "1,0,0"))
(rule "add_zero_right" (formula "18") (term "0,0"))
(rule "qeq_literals" (formula "18") (term "0"))
(builtin "One Step Simplification" (formula "18"))
(rule "true_left" (formula "18"))
(rule "inEqSimp_exactShadow3" (formula "4") (ifseqformula "20"))
(rule "polySimp_rightDist" (formula "4") (term "0,0"))
(rule "mul_literals" (formula "4") (term "0,0,0"))
(rule "inEqSimp_sepPosMonomial1" (formula "4"))
(rule "polySimp_mulComm0" (formula "4") (term "1"))
(rule "polySimp_rightDist" (formula "4") (term "1"))
(rule "mul_literals" (formula "4") (term "0,1"))
(rule "polySimp_mulLiterals" (formula "4") (term "1,1"))
(rule "polySimp_elimOne" (formula "4") (term "1,1"))
(rule "inEqSimp_contradInEq1" (formula "6") (ifseqformula "4"))
(rule "andLeft" (formula "6"))
(rule "inEqSimp_homoInEq1" (formula "6"))
(rule "polySimp_mulComm0" (formula "6") (term "1,0"))
(rule "polySimp_rightDist" (formula "6") (term "1,0"))
(rule "mul_literals" (formula "6") (term "0,1,0"))
(rule "polySimp_addAssoc" (formula "6") (term "0"))
(rule "polySimp_addComm1" (formula "6") (term "0,0"))
(rule "add_literals" (formula "6") (term "0,0,0"))
(rule "polySimp_pullOutFactor1b" (formula "6") (term "0"))
(rule "add_literals" (formula "6") (term "1,1,0"))
(rule "times_zero_1" (formula "6") (term "1,0"))
(rule "add_zero_right" (formula "6") (term "0"))
(rule "leq_literals" (formula "6"))
(rule "closeFalse" (formula "6"))
)
)
(branch "if x_7 false"
(builtin "One Step Simplification" (formula "20"))
(builtin "One Step Simplification" (formula "1"))
(rule "notLeft" (formula "1"))
(rule "inEqSimp_leqRight" (formula "17"))
(rule "polySimp_rightDist" (formula "1") (term "1,0,0"))
(rule "mul_literals" (formula "1") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "1") (term "0,0"))
(rule "add_literals" (formula "1") (term "0,0,0"))
(rule "add_zero_left" (formula "1") (term "0,0"))
(rule "inEqSimp_sepPosMonomial1" (formula "1"))
(rule "polySimp_mulLiterals" (formula "1") (term "1"))
(rule "polySimp_elimOne" (formula "1") (term "1"))
(rule "assignmentAdditionInt" (formula "20") (term "1"))
(builtin "One Step Simplification" (formula "20"))
(rule "translateJavaAddInt" (formula "20") (term "0,1,0"))
(rule "polySimp_addComm0" (formula "20") (term "0,1,0"))
(rule "tryEmpty" (formula "20") (term "1"))
(rule "methodCallEmpty" (formula "20") (term "1"))
(rule "emptyModality" (formula "20") (term "1"))
(builtin "One Step Simplification" (formula "20") (ifInst "" (formula "2")) (ifInst "" (formula "16")) (ifInst "" (formula "12")))
(rule "polySimp_mulComm0" (formula "20") (term "0,0,1"))
(rule "polySimp_rightDist" (formula "20") (term "0,0,1"))
(rule "mul_literals" (formula "20") (term "0,0,0,1"))
(rule "precOfInt" (formula "20") (term "1"))
(rule "inEqSimp_ltToLeq" (formula "20") (term "1,1"))
(rule "polySimp_rightDist" (formula "20") (term "1,0,0,1,1"))
(rule "polySimp_mulAssoc" (formula "20") (term "0,1,0,0,1,1"))
(rule "polySimp_mulComm0" (formula "20") (term "0,0,1,0,0,1,1"))
(rule "polySimp_mulLiterals" (formula "20") (term "0,1,0,0,1,1"))
(rule "polySimp_elimOne" (formula "20") (term "0,1,0,0,1,1"))
(rule "polySimp_addAssoc" (formula "20") (term "0,0,1,1"))
(rule "polySimp_addAssoc" (formula "20") (term "0,1,1"))
(rule "polySimp_addComm1" (formula "20") (term "0,0,1,1"))
(rule "polySimp_pullOutFactor2b" (formula "20") (term "0,1,1"))
(rule "add_literals" (formula "20") (term "1,1,0,1,1"))
(rule "times_zero_1" (formula "20") (term "1,0,1,1"))
(rule "add_zero_right" (formula "20") (term "0,1,1"))
(rule "polySimp_addAssoc" (formula "20") (term "0,1,1"))
(rule "polySimp_addComm1" (formula "20") (term "0,0,1,1"))
(rule "add_literals" (formula "20") (term "0,0,0,1,1"))
(rule "add_zero_left" (formula "20") (term "0,0,1,1"))
(rule "polySimp_pullOutFactor1" (formula "20") (term "0,1,1"))
(rule "add_literals" (formula "20") (term "1,0,1,1"))
(rule "times_zero_1" (formula "20") (term "0,1,1"))
(rule "leq_literals" (formula "20") (term "1,1"))
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_commuteGeq" (formula "20") (term "0,0,0"))
(rule "inEqSimp_commuteGeq" (formula "20") (term "1,0,0"))
(rule "replace_known_left" (formula "20") (term "1,0,0") (ifseqformula "15"))
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_homoInEq0" (formula "20") (term "1"))
(rule "mul_literals" (formula "20") (term "1,0,1"))
(rule "add_zero_right" (formula "20") (term "0,1"))
(rule "inEqSimp_sepPosMonomial1" (formula "20") (term "1"))
(rule "polySimp_mulComm0" (formula "20") (term "1,1"))
(rule "polySimp_rightDist" (formula "20") (term "1,1"))
(rule "mul_literals" (formula "20") (term "0,1,1"))
(rule "polySimp_mulLiterals" (formula "20") (term "1,1,1"))
(rule "polySimp_elimOne" (formula "20") (term "1,1,1"))
(rule "replace_known_left" (formula "20") (term "1") (ifseqformula "2"))
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_subsumption0" (formula "20") (term "0") (ifseqformula "14"))
(rule "inEqSimp_homoInEq0" (formula "20") (term "0,0"))
(rule "polySimp_pullOutFactor1b" (formula "20") (term "0,0,0"))
(rule "add_literals" (formula "20") (term "1,1,0,0,0"))
(rule "times_zero_1" (formula "20") (term "1,0,0,0"))
(rule "add_literals" (formula "20") (term "0,0,0"))
(rule "qeq_literals" (formula "20") (term "0,0"))
(builtin "One Step Simplification" (formula "20"))
(rule "allRight" (formula "20") (inst "sk=x_0"))
(rule "orRight" (formula "20"))
(rule "orRight" (formula "20"))
(rule "inEqSimp_leqRight" (formula "22"))
(rule "polySimp_mulComm0" (formula "1") (term "1,0,0"))
(rule "inEqSimp_leqRight" (formula "21"))
(rule "polySimp_rightDist" (formula "1") (term "1,0,0"))
(rule "mul_literals" (formula "1") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "1") (term "0,0"))
(rule "add_literals" (formula "1") (term "0,0,0"))
(rule "add_zero_left" (formula "1") (term "0,0"))
(rule "inEqSimp_geqRight" (formula "22"))
(rule "polySimp_rightDist" (formula "1") (term "1,0,0"))
(rule "mul_literals" (formula "1") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "1") (term "0,0"))
(rule "add_literals" (formula "1") (term "0,0,0"))
(rule "add_zero_left" (formula "1") (term "0,0"))
(rule "inEqSimp_sepPosMonomial1" (formula "3"))
(rule "polySimp_mulComm0" (formula "3") (term "1"))
(rule "polySimp_rightDist" (formula "3") (term "1"))
(rule "polySimp_mulLiterals" (formula "3") (term "1,1"))
(rule "mul_literals" (formula "3") (term "0,1"))
(rule "polySimp_elimOne" (formula "3") (term "1,1"))
(rule "inEqSimp_sepPosMonomial1" (formula "2"))
(rule "polySimp_mulLiterals" (formula "2") (term "1"))
(rule "polySimp_elimOne" (formula "2") (term "1"))
(rule "inEqSimp_sepPosMonomial0" (formula "1"))
(rule "polySimp_mulLiterals" (formula "1") (term "1"))
(rule "polySimp_elimOne" (formula "1") (term "1"))
(rule "inEqSimp_exactShadow3" (formula "2") (ifseqformula "1"))
(rule "polySimp_mulComm0" (formula "2") (term "0,0"))
(rule "polySimp_addComm0" (formula "2") (term "0"))
(rule "inEqSimp_sepNegMonomial1" (formula "2"))
(rule "polySimp_mulLiterals" (formula "2") (term "0"))
(rule "polySimp_elimOne" (formula "2") (term "0"))
(rule "allLeft" (formula "20") (inst "t=x_0"))
(rule "inEqSimp_contradInEq1" (formula "20") (term "1,0") (ifseqformula "2"))
(rule "inEqSimp_homoInEq1" (formula "20") (term "0,1,0"))
(rule "polySimp_mulComm0" (formula "20") (term "1,0,0,1,0"))
(rule "polySimp_rightDist" (formula "20") (term "1,0,0,1,0"))
(rule "mul_literals" (formula "20") (term "0,1,0,0,1,0"))
(rule "polySimp_addAssoc" (formula "20") (term "0,0,1,0"))
(rule "polySimp_addComm0" (formula "20") (term "0,0,0,1,0"))
(rule "polySimp_pullOutFactor1b" (formula "20") (term "0,0,1,0"))
(rule "add_literals" (formula "20") (term "1,1,0,0,1,0"))
(rule "times_zero_1" (formula "20") (term "1,0,0,1,0"))
(rule "add_zero_right" (formula "20") (term "0,0,1,0"))
(rule "leq_literals" (formula "20") (term "0,1,0"))
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_contradInEq1" (formula "20") (term "1") (ifseqformula "3"))
(rule "inEqSimp_homoInEq1" (formula "20") (term "0,1"))
(rule "polySimp_pullOutFactor1b" (formula "20") (term "0,0,1"))
(rule "add_literals" (formula "20") (term "1,1,0,0,1"))
(rule "times_zero_1" (formula "20") (term "1,0,0,1"))
(rule "add_zero_right" (formula "20") (term "0,0,1"))
(rule "leq_literals" (formula "20") (term "0,1"))
(builtin "One Step Simplification" (formula "20"))
(rule "inEqSimp_antiSymm" (formula "20") (ifseqformula "1"))
(rule "applyEqRigid" (formula "1") (term "0") (ifseqformula "20"))
(rule "inEqSimp_homoInEq0" (formula "1"))
(rule "polySimp_pullOutFactor1" (formula "1") (term "0"))
(rule "add_literals" (formula "1") (term "1,0"))
(rule "times_zero_1" (formula "1") (term "0"))
(rule "qeq_literals" (formula "1"))
(rule "true_left" (formula "1"))
(rule "applyEq" (formula "20") (term "0") (ifseqformula "19"))
(rule "inEqSimp_homoInEq1" (formula "20"))
(rule "polySimp_pullOutFactor1" (formula "20") (term "0"))
(rule "add_literals" (formula "20") (term "1,0"))
(rule "times_zero_1" (formula "20") (term "0"))
(rule "leq_literals" (formula "20"))
(rule "true_left" (formula "20"))
(rule "applyEq" (formula "2") (term "0,2,0") (ifseqformula "19"))
(rule "inEqSimp_homoInEq1" (formula "2"))
(rule "polySimp_addComm1" (formula "2") (term "0"))
(rule "applyEqRigid" (formula "1") (term "0") (ifseqformula "19"))
(rule "inEqSimp_commuteGeq" (formula "1"))
(rule "inEqSimp_sepPosMonomial0" (formula "1"))
(rule "polySimp_mulComm0" (formula "1") (term "1"))
(rule "polySimp_rightDist" (formula "1") (term "1"))
(rule "mul_literals" (formula "1") (term "0,1"))
(rule "polySimp_mulLiterals" (formula "1") (term "1,1"))
(rule "polySimp_elimOne" (formula "1") (term "1,1"))
(rule "inEqSimp_contradInEq0" (formula "2") (ifseqformula "1"))
(rule "andLeft" (formula "2"))
(rule "inEqSimp_homoInEq1" (formula "2"))
(rule "polySimp_mulComm0" (formula "2") (term "1,0"))
(rule "polySimp_rightDist" (formula "2") (term "1,0"))
(rule "mul_literals" (formula "2") (term "0,1,0"))
(rule "polySimp_addAssoc" (formula "2") (term "0"))
(rule "polySimp_addComm0" (formula "2") (term "0,0"))
(rule "polySimp_pullOutFactor1b" (formula "2") (term "0"))
(rule "add_literals" (formula "2") (term "1,1,0"))
(rule "times_zero_1" (formula "2") (term "1,0"))
(rule "add_zero_right" (formula "2") (term "0"))
(rule "leq_literals" (formula "2"))
(rule "closeFalse" (formula "2"))
)
)
(branch "Null Reference (x_arr_4 = null)"
(rule "false_right" (formula "19"))
(builtin "One Step Simplification" (formula "1") (ifInst "" (formula "17")))
(rule "closeFalse" (formula "1"))
)
(branch "Index Out of Bounds (x_arr_4 != null, but idx Out of Bounds!)"
(rule "false_right" (formula "19"))
(builtin "One Step Simplification" (formula "1") (ifInst "" (formula "17")))
(rule "inEqSimp_ltToLeq" (formula "1") (term "1"))
(rule "times_zero_1" (formula "1") (term "1,0,0,1"))
(rule "add_zero_right" (formula "1") (term "0,0,1"))
(rule "inEqSimp_sepPosMonomial0" (formula "1") (term "1"))
(rule "mul_literals" (formula "1") (term "1,1"))
(rule "inEqSimp_contradInEq1" (formula "1") (term "0") (ifseqformula "15"))
(rule "inEqSimp_homoInEq1" (formula "1") (term "0,0"))
(rule "polySimp_pullOutFactor1b" (formula "1") (term "0,0,0"))
(rule "add_literals" (formula "1") (term "1,1,0,0,0"))
(rule "times_zero_1" (formula "1") (term "1,0,0,0"))
(rule "add_zero_right" (formula "1") (term "0,0,0"))
(rule "leq_literals" (formula "1") (term "0,0"))
(builtin "One Step Simplification" (formula "1"))
(rule "inEqSimp_contradInEq1" (formula "1") (ifseqformula "8"))
(rule "qeq_literals" (formula "1") (term "0"))
(builtin "One Step Simplification" (formula "1"))
(rule "closeFalse" (formula "1"))
)
)
(branch "Null Reference (x_arr_3 = null)"
(builtin "One Step Simplification" (formula "19"))
(builtin "One Step Simplification" (formula "1") (ifInst "" (formula "17")))
(rule "closeFalse" (formula "1"))
)
(branch "Index Out of Bounds (x_arr_3 != null, but counter Out of Bounds!)"
(rule "false_right" (formula "19"))
(builtin "One Step Simplification" (formula "1") (ifInst "" (formula "17")))
(rule "inEqSimp_ltToLeq" (formula "1") (term "1"))
(rule "times_zero_1" (formula "1") (term "1,0,0,1"))
(rule "add_zero_right" (formula "1") (term "0,0,1"))
(rule "inEqSimp_sepPosMonomial0" (formula "1") (term "1"))
(rule "mul_literals" (formula "1") (term "1,1"))
(rule "inEqSimp_contradInEq1" (formula "1") (term "0") (ifseqformula "2"))
(rule "inEqSimp_homoInEq1" (formula "1") (term "0,0"))
(rule "polySimp_pullOutFactor1b" (formula "1") (term "0,0,0"))
(rule "add_literals" (formula "1") (term "1,1,0,0,0"))
(rule "times_zero_1" (formula "1") (term "1,0,0,0"))
(rule "add_zero_right" (formula "1") (term "0,0,0"))
(rule "leq_literals" (formula "1") (term "0,0"))
(builtin "One Step Simplification" (formula "1"))
(rule "inEqSimp_contradInEq1" (formula "1") (ifseqformula "9"))
(rule "qeq_literals" (formula "1") (term "0"))
(builtin "One Step Simplification" (formula "1"))
(rule "closeFalse" (formula "1"))
)
)
(branch "if x_4 false"
(builtin "One Step Simplification" (formula "19"))
(builtin "One Step Simplification" (formula "1"))
(rule "closeFalse" (formula "1"))
)
)
(branch "Null Reference (x_arr_2 = null)"
(builtin "One Step Simplification" (formula "19"))
(builtin "One Step Simplification" (formula "1") (ifInst "" (formula "17")))
(rule "closeFalse" (formula "1"))
)
)
(branch "Null Reference (x_arr_1 = null)"
(rule "false_right" (formula "17"))
(builtin "One Step Simplification" (formula "1") (ifInst "" (formula "17")))
(rule "closeFalse" (formula "1"))
)
)
(branch "Use Case"
(builtin "One Step Simplification" (formula "9"))
(builtin "One Step Simplification" (formula "12"))
(rule "andLeft" (formula "9"))
(rule "andLeft" (formula "9"))
(rule "andLeft" (formula "9"))
(rule "andLeft" (formula "9"))
(rule "andLeft" (formula "9"))
(rule "inEqSimp_ltToLeq" (formula "14") (term "1,0,0"))
(rule "polySimp_mulComm0" (formula "14") (term "1,0,0,1,0,0"))
(rule "inEqSimp_ltToLeq" (formula "13"))
(rule "polySimp_mulComm0" (formula "13") (term "1,0,0"))
(rule "polySimp_addComm1" (formula "13") (term "0"))
(rule "inEqSimp_ltToLeq" (formula "12"))
(rule "polySimp_mulComm0" (formula "12") (term "1,0,0"))
(rule "polySimp_addComm1" (formula "12") (term "0"))
(rule "inEqSimp_commuteGeq" (formula "14") (term "1,0"))
(rule "inEqSimp_commuteLeq" (formula "10"))
(rule "variableDeclarationAssign" (formula "17") (term "1"))
(rule "variableDeclaration" (formula "17") (term "1") (newnames "b_1"))
(rule "inEqSimp_sepPosMonomial0" (formula "14") (term "1,0,0"))
(rule "polySimp_mulComm0" (formula "14") (term "1,1,0,0"))
(rule "polySimp_rightDist" (formula "14") (term "1,1,0,0"))
(rule "polySimp_mulLiterals" (formula "14") (term "1,1,1,0,0"))
(rule "mul_literals" (formula "14") (term "0,1,1,0,0"))
(rule "polySimp_elimOne" (formula "14") (term "1,1,1,0,0"))
(rule "inEqSimp_sepNegMonomial0" (formula "13"))
(rule "polySimp_mulLiterals" (formula "13") (term "0"))
(rule "polySimp_elimOne" (formula "13") (term "0"))
(rule "inEqSimp_sepNegMonomial0" (formula "12"))
(rule "polySimp_mulLiterals" (formula "12") (term "0"))
(rule "polySimp_elimOne" (formula "12") (term "0"))
(rule "inEqSimp_exactShadow3" (formula "6") (ifseqformula "9"))
(rule "times_zero_1" (formula "6") (term "0,0"))
(rule "add_zero_left" (formula "6") (term "0"))
(rule "inEqSimp_exactShadow3" (formula "7") (ifseqformula "12"))
(rule "times_zero_1" (formula "7") (term "0,0"))
(rule "add_zero_left" (formula "7") (term "0"))
(rule "nnf_imp2or" (formula "15") (term "0"))
(rule "nnf_notAnd" (formula "15") (term "0,0"))
(rule "inEqSimp_notLeq" (formula "15") (term "1,0,0"))
(rule "polySimp_rightDist" (formula "15") (term "1,0,0,1,0,0"))
(rule "mul_literals" (formula "15") (term "0,1,0,0,1,0,0"))
(rule "polySimp_addAssoc" (formula "15") (term "0,0,1,0,0"))
(rule "add_literals" (formula "15") (term "0,0,0,1,0,0"))
(rule "add_zero_left" (formula "15") (term "0,0,1,0,0"))
(rule "inEqSimp_sepPosMonomial1" (formula "15") (term "1,0,0"))
(rule "polySimp_mulLiterals" (formula "15") (term "1,1,0,0"))
(rule "polySimp_elimOne" (formula "15") (term "1,1,0,0"))
(rule "inEqSimp_notGeq" (formula "15") (term "0,0,0"))
(rule "polySimp_mulComm0" (formula "15") (term "1,0,0,0,0,0"))
(rule "inEqSimp_sepPosMonomial0" (formula "15") (term "0,0,0"))
(rule "polySimp_mulComm0" (formula "15") (term "1,0,0,0"))
(rule "polySimp_rightDist" (formula "15") (term "1,0,0,0"))
(rule "polySimp_mulLiterals" (formula "15") (term "1,1,0,0,0"))
(rule "mul_literals" (formula "15") (term "0,1,0,0,0"))
(rule "polySimp_elimOne" (formula "15") (term "1,1,0,0,0"))
(rule "commute_or" (formula "15") (term "0,0"))
(rule "compound_less_than_comparison_2" (formula "18") (term "1") (inst "#v1=x_1") (inst "#v0=x"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x"))
(rule "assignment" (formula "18") (term "1"))
(builtin "One Step Simplification" (formula "18"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_1"))
(rule "eval_order_array_access6" (formula "18") (term "1") (inst "#v0=x_arr"))
(rule "variableDeclarationAssign" (formula "18") (term "1"))
(rule "variableDeclaration" (formula "18") (term "1") (newnames "x_arr"))
(rule "assignment_read_attribute_this" (formula "18"))
(builtin "One Step Simplification" (formula "18"))
(rule "assignment_read_length" (formula "18"))
(branch "Normal Execution (x_arr != null)"
(builtin "One Step Simplification" (formula "18"))
(rule "less_than_comparison_simple" (formula "18") (term "1"))
(builtin "One Step Simplification" (formula "18"))
(rule "inEqSimp_ltToLeq" (formula "18") (term "0,0,1,0"))
(rule "polySimp_mulComm0" (formula "18") (term "1,0,0,0,0,1,0"))
(rule "polySimp_addComm1" (formula "18") (term "0,0,0,1,0"))
(rule "inEqSimp_sepNegMonomial0" (formula "18") (term "0,0,1,0"))
(rule "polySimp_mulLiterals" (formula "18") (term "0,0,0,1,0"))
(rule "polySimp_elimOne" (formula "18") (term "0,0,0,1,0"))
(rule "methodCallEmpty" (formula "18") (term "1"))
(rule "emptyModality" (formula "18") (term "1"))
(builtin "One Step Simplification" (formula "18"))
(rule "impRight" (formula "18"))
(rule "notLeft" (formula "1"))
(rule "inEqSimp_geqRight" (formula "16"))
(rule "polySimp_rightDist" (formula "1") (term "1,0,0"))
(rule "mul_literals" (formula "1") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "1") (term "0,0"))
(rule "add_literals" (formula "1") (term "0,0,0"))
(rule "add_zero_left" (formula "1") (term "0,0"))
(rule "inEqSimp_sepPosMonomial0" (formula "1"))
(rule "polySimp_mulLiterals" (formula "1") (term "1"))
(rule "polySimp_elimOne" (formula "1") (term "1"))
(rule "inEqSimp_antiSymm" (formula "13") (ifseqformula "1"))
(rule "applyEq" (formula "1") (term "0") (ifseqformula "13"))
(rule "inEqSimp_homoInEq0" (formula "1"))
(rule "polySimp_pullOutFactor1" (formula "1") (term "0"))
(rule "add_literals" (formula "1") (term "1,0"))
(rule "times_zero_1" (formula "1") (term "0"))
(rule "qeq_literals" (formula "1"))
(rule "true_left" (formula "1"))
(rule "applyEq" (formula "13") (term "0") (ifseqformula "12"))
(rule "inEqSimp_homoInEq1" (formula "13"))
(rule "polySimp_pullOutFactor1" (formula "13") (term "0"))
(rule "add_literals" (formula "13") (term "1,0"))
(rule "times_zero_1" (formula "13") (term "0"))
(rule "leq_literals" (formula "13"))
(rule "true_left" (formula "13"))
(rule "applyEq" (formula "5") (term "0") (ifseqformula "12"))
(rule "applyEq" (formula "14") (term "0") (ifseqformula "12"))
(rule "inEqSimp_homoInEq1" (formula "14"))
(rule "polySimp_addComm1" (formula "14") (term "0"))
(rule "applyEq" (formula "9") (term "0") (ifseqformula "12"))
(rule "inEqSimp_homoInEq1" (formula "9"))
(rule "polySimp_addComm1" (formula "9") (term "0"))
(rule "inEqSimp_sepPosMonomial0" (formula "14"))
(rule "polySimp_mulComm0" (formula "14") (term "1"))
(rule "polySimp_rightDist" (formula "14") (term "1"))
(rule "mul_literals" (formula "14") (term "0,1"))
(rule "polySimp_mulLiterals" (formula "14") (term "1,1"))
(rule "polySimp_elimOne" (formula "14") (term "1,1"))
(rule "inEqSimp_sepPosMonomial0" (formula "9"))
(rule "polySimp_mulComm0" (formula "9") (term "1"))
(rule "polySimp_rightDist" (formula "9") (term "1"))
(rule "mul_literals" (formula "9") (term "0,1"))
(rule "polySimp_mulLiterals" (formula "9") (term "1,1"))
(rule "polySimp_elimOne" (formula "9") (term "1,1"))
(rule "inEqSimp_subsumption1" (formula "6") (ifseqformula "5"))
(rule "leq_literals" (formula "6") (term "0"))
(builtin "One Step Simplification" (formula "6"))
(rule "true_left" (formula "6"))
(rule "inEqSimp_subsumption0" (formula "10") (ifseqformula "8"))
(rule "inEqSimp_homoInEq0" (formula "10") (term "0"))
(rule "polySimp_mulComm0" (formula "10") (term "1,0,0"))
(rule "polySimp_rightDist" (formula "10") (term "1,0,0"))
(rule "mul_literals" (formula "10") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "10") (term "0,0"))
(rule "polySimp_addComm0" (formula "10") (term "0,0,0"))
(rule "polySimp_pullOutFactor1b" (formula "10") (term "0,0"))
(rule "add_literals" (formula "10") (term "1,1,0,0"))
(rule "times_zero_1" (formula "10") (term "1,0,0"))
(rule "add_literals" (formula "10") (term "0,0"))
(rule "qeq_literals" (formula "10") (term "0"))
(builtin "One Step Simplification" (formula "10"))
(rule "true_left" (formula "10"))
(rule "inEqSimp_exactShadow3" (formula "6") (ifseqformula "12"))
(rule "times_zero_1" (formula "6") (term "0,0"))
(rule "add_zero_left" (formula "6") (term "0"))
(rule "inEqSimp_sepPosMonomial1" (formula "6"))
(rule "mul_literals" (formula "6") (term "1"))
(rule "inEqSimp_exactShadow3" (formula "7") (ifseqformula "8"))
(rule "times_zero_1" (formula "7") (term "0,0"))
(rule "add_zero_left" (formula "7") (term "0"))
(rule "inEqSimp_sepPosMonomial1" (formula "7"))
(rule "mul_literals" (formula "7") (term "1"))
(rule "methodCallReturn" (formula "16") (term "1"))
(rule "assignment" (formula "16") (term "1"))
(builtin "One Step Simplification" (formula "16"))
(rule "methodCallEmpty" (formula "16") (term "1"))
(rule "tryEmpty" (formula "16") (term "1"))
(rule "emptyModality" (formula "16") (term "1"))
(builtin "One Step Simplification" (formula "16") (ifInst "" (formula "11")))
(rule "applyEq" (formula "16") (term "1,1,0,0,0") (ifseqformula "10"))
(rule "applyEq" (formula "16") (term "0,0,1") (ifseqformula "10"))
(rule "inEqSimp_homoInEq1" (formula "16") (term "0,1"))
(rule "polySimp_addComm1" (formula "16") (term "0,0,1"))
(rule "inEqSimp_sepPosMonomial0" (formula "16") (term "0,1"))
(rule "polySimp_mulComm0" (formula "16") (term "1,0,1"))
(rule "polySimp_rightDist" (formula "16") (term "1,0,1"))
(rule "polySimp_mulLiterals" (formula "16") (term "1,1,0,1"))
(rule "mul_literals" (formula "16") (term "0,1,0,1"))
(rule "polySimp_elimOne" (formula "16") (term "1,1,0,1"))
(rule "replace_known_left" (formula "16") (term "0,1") (ifseqformula "12"))
(builtin "One Step Simplification" (formula "16"))
(rule "Class_invariant_axiom_for_SortPerm" (formula "16") (term "1") (inst "sk=sk_1") (ifseqformula "3"))
(branch "Use Axiom"
(rule "replace_known_right" (formula "16") (term "0,1") (ifseqformula "14"))
(builtin "One Step Simplification" (formula "16"))
(rule "allRight" (formula "16") (inst "sk=i_0"))
(rule "orRight" (formula "16"))
(rule "orRight" (formula "16"))
(rule "inEqSimp_leqRight" (formula "18"))
(rule "polySimp_mulComm0" (formula "1") (term "1,0,0"))
(rule "polySimp_addComm1" (formula "1") (term "0"))
(rule "inEqSimp_geqRight" (formula "18"))
(rule "polySimp_mulComm0" (formula "1") (term "1,0,0"))
(rule "inEqSimp_leqRight" (formula "18"))
(rule "polySimp_rightDist" (formula "1") (term "1,0,0"))
(rule "mul_literals" (formula "1") (term "0,1,0,0"))
(rule "polySimp_addAssoc" (formula "1") (term "0,0"))
(rule "add_literals" (formula "1") (term "0,0,0"))
(rule "add_zero_left" (formula "1") (term "0,0"))
(rule "polySimp_addComm0" (formula "1") (term "0"))
(rule "inEqSimp_sepNegMonomial1" (formula "3"))
(rule "polySimp_mulLiterals" (formula "3") (term "0"))
(rule "polySimp_elimOne" (formula "3") (term "0"))
(rule "inEqSimp_sepPosMonomial0" (formula "2"))
(rule "polySimp_mulComm0" (formula "2") (term "1"))
(rule "polySimp_rightDist" (formula "2") (term "1"))
(rule "mul_literals" (formula "2") (term "0,1"))
(rule "polySimp_mulLiterals" (formula "2") (term "1,1"))
(rule "polySimp_elimOne" (formula "2") (term "1,1"))
(rule "inEqSimp_sepNegMonomial1" (formula "1"))
(rule "polySimp_mulLiterals" (formula "1") (term "0"))
(rule "polySimp_elimOne" (formula "1") (term "0"))
(rule "inEqSimp_exactShadow3" (formula "10") (ifseqformula "1"))
(rule "times_zero_1" (formula "10") (term "0,0"))
(rule "add_zero_left" (formula "10") (term "0"))
(rule "inEqSimp_exactShadow3" (formula "10") (ifseqformula "2"))
(rule "times_zero_1" (formula "10") (term "0,0"))
(rule "add_zero_left" (formula "10") (term "0"))
(rule "inEqSimp_sepPosMonomial1" (formula "10"))
(rule "mul_literals" (formula "10") (term "1"))
(rule "allLeft" (formula "17") (inst "t=i_0"))
(rule "inEqSimp_commuteLeq" (formula "17") (term "1"))
(rule "inEqSimp_homoInEq0" (formula "17") (term "1,0"))
(rule "polySimp_addComm1" (formula "17") (term "0,1,0"))
(rule "inEqSimp_sepPosMonomial1" (formula "17") (term "1,0"))
(rule "polySimp_mulComm0" (formula "17") (term "1,1,0"))
(rule "polySimp_rightDist" (formula "17") (term "1,1,0"))
(rule "mul_literals" (formula "17") (term "0,1,1,0"))
(rule "polySimp_mulLiterals" (formula "17") (term "1,1,1,0"))
(rule "polySimp_elimOne" (formula "17") (term "1,1,1,0"))
(rule "inEqSimp_contradInEq0" (formula "17") (term "1") (ifseqformula "3"))
(rule "inEqSimp_homoInEq1" (formula "17") (term "0,1"))
(rule "polySimp_mulComm0" (formula "17") (term "1,0,0,1"))
(rule "polySimp_rightDist" (formula "17") (term "1,0,0,1"))
(rule "mul_literals" (formula "17") (term "0,1,0,0,1"))
(rule "polySimp_addAssoc" (formula "17") (term "0,0,1"))
(rule "polySimp_addComm0" (formula "17") (term "0,0,0,1"))
(rule "polySimp_pullOutFactor1b" (formula "17") (term "0,0,1"))
(rule "add_literals" (formula "17") (term "1,1,0,0,1"))
(rule "times_zero_1" (formula "17") (term "1,0,0,1"))
(rule "add_zero_right" (formula "17") (term "0,0,1"))
(rule "leq_literals" (formula "17") (term "0,1"))
(builtin "One Step Simplification" (formula "17"))
(rule "inEqSimp_contradInEq0" (formula "17") (term "0") (ifseqformula "2"))
(rule "inEqSimp_homoInEq1" (formula "17") (term "0,0"))
(rule "polySimp_mulComm0" (formula "17") (term "1,0,0,0"))
(rule "polySimp_rightDist" (formula "17") (term "1,0,0,0"))
(rule "mul_literals" (formula "17") (term "0,1,0,0,0"))
(rule "polySimp_addAssoc" (formula "17") (term "0,0,0"))
(rule "polySimp_addComm0" (formula "17") (term "0,0,0,0"))
(rule "polySimp_pullOutFactor1b" (formula "17") (term "0,0,0"))
(rule "add_literals" (formula "17") (term "1,1,0,0,0"))
(rule "times_zero_1" (formula "17") (term "1,0,0,0"))
(rule "add_zero_right" (formula "17") (term "0,0,0"))
(rule "leq_literals" (formula "17") (term "0,0"))
(builtin "One Step Simplification" (formula "17"))
(rule "inEqSimp_contradInEq1" (formula "1") (ifseqformula "17"))
(rule "andLeft" (formula "1"))
(rule "inEqSimp_homoInEq1" (formula "1"))
(rule "polySimp_pullOutFactor1b" (formula "1") (term "0"))
(rule "add_literals" (formula "1") (term "1,1,0"))
(rule "times_zero_1" (formula "1") (term "1,0"))
(rule "add_zero_right" (formula "1") (term "0"))
(rule "leq_literals" (formula "1"))
(rule "closeFalse" (formula "1"))
)
(branch "Show Axiom Satisfiability"
(builtin "One Step Simplification" (formula "16") (ifInst "" (formula "14")) (ifInst "" (formula "14")))
(rule "closeTrue" (formula "16"))
)
)
(branch "Null Reference (x_arr = null)"
(builtin "One Step Simplification" (formula "19"))
(builtin "One Step Simplification" (formula "1") (ifInst "" (formula "17")))
(rule "closeFalse" (formula "1"))
)
)
)
(branch "Show Axiom Satisfiability"
(builtin "One Step Simplification" (formula "9"))
(rule "closeTrue" (formula "9"))
)
)
}