34.61/9.61 NO 34.61/9.63 proof of /export/starexec/sandbox/benchmark/theBenchmark.c 34.61/9.63 # AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty 34.61/9.63 34.61/9.63 34.61/9.63 Termination of the given C Problem could be disproven: 34.61/9.63 34.61/9.63 (0) C Problem 34.61/9.63 (1) CToLLVMProof [EQUIVALENT, 169 ms] 34.61/9.63 (2) LLVM problem 34.61/9.63 (3) LLVMToTerminationGraphProof [EQUIVALENT, 1157 ms] 34.61/9.63 (4) LLVM Symbolic Execution Graph 34.61/9.63 (5) SymbolicExecutionGraphToLassoProof [EQUIVALENT, 3 ms] 34.61/9.63 (6) LLVM Symbolic Execution Lasso 34.61/9.63 (7) Lasso2IRS [EQUIVALENT, 45 ms] 34.61/9.63 (8) IntTRS 34.61/9.63 (9) IRS2T2 [EQUIVALENT, 0 ms] 34.61/9.63 (10) T2IntSys 34.61/9.63 (11) T2 Underapproximation [COMPLETE, 1753 ms] 34.61/9.63 (12) T2IntSys 34.61/9.63 (13) T2 [COMPLETE, 2003 ms] 34.61/9.63 (14) NO 34.61/9.63 34.61/9.63 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (0) 34.61/9.63 Obligation: 34.61/9.63 c file /export/starexec/sandbox/benchmark/theBenchmark.c 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (1) CToLLVMProof (EQUIVALENT) 34.61/9.63 Compiled c-file /export/starexec/sandbox/benchmark/theBenchmark.c to LLVM. 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (2) 34.61/9.63 Obligation: 34.61/9.63 LLVM Problem 34.61/9.63 34.61/9.63 Aliases: 34.61/9.63 34.61/9.63 Data layout: 34.61/9.63 34.61/9.63 "e-p:64:64:64-i1:8:8-i8:8:8-i16:16:16-i32:32:32-i64:64:64-f32:32:32-f64:64:64-v64:64:64-v128:128:128-a0:0:64-s0:64:64-f80:128:128-n8:16:32:64-S128" 34.61/9.63 34.61/9.63 Machine: 34.61/9.63 34.61/9.63 "x86_64-pc-linux-gnu" 34.61/9.63 34.61/9.63 Type definitions: 34.61/9.63 34.61/9.63 Global variables: 34.61/9.63 34.61/9.63 Function declarations and definitions: 34.61/9.63 34.61/9.63 *BasicFunctionTypename: "__VERIFIER_nondet_int" returnParam: i32 parameters: () variableLength: false visibilityType: DEFAULT callingConvention: ccc 34.61/9.63 *BasicFunctionTypename: "main" linkageType: EXTERNALLY_VISIBLE returnParam: i32 parameters: () variableLength: false visibilityType: DEFAULT callingConvention: ccc 34.61/9.63 0: 34.61/9.63 %1 = alloca i32, align 4 34.61/9.63 %x = alloca i32, align 4 34.61/9.63 %y = alloca i32, align 4 34.61/9.63 %z = alloca i32, align 4 34.61/9.63 store 0, %1 34.61/9.63 %2 = call i32 @__VERIFIER_nondet_int() 34.61/9.63 store %2, %x 34.61/9.63 %3 = call i32 @__VERIFIER_nondet_int() 34.61/9.63 store %3, %y 34.61/9.63 %4 = call i32 @__VERIFIER_nondet_int() 34.61/9.63 store %4, %z 34.61/9.63 br %5 34.61/9.63 5: 34.61/9.63 %6 = load %x 34.61/9.63 %7 = icmp slt %6 0 34.61/9.63 br %7, %8, %16 34.61/9.63 8: 34.61/9.63 %9 = load %x 34.61/9.63 %10 = load %z 34.61/9.63 %11 = add %9 %10 34.61/9.63 store %11, %x 34.61/9.63 %12 = load %y 34.61/9.63 %13 = mul -2 %12 34.61/9.63 store %13, %z 34.61/9.63 %14 = load %y 34.61/9.63 %15 = add %14 1 34.61/9.63 store %15, %y 34.61/9.63 br %5 34.61/9.63 16: 34.61/9.63 ret 0 34.61/9.63 34.61/9.63 34.61/9.63 Analyze Termination of all function calls matching the pattern: 34.61/9.63 main() 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (3) LLVMToTerminationGraphProof (EQUIVALENT) 34.61/9.63 Constructed symbolic execution graph for LLVM program and proved memory safety. 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (4) 34.61/9.63 Obligation: 34.61/9.63 SE Graph 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (5) SymbolicExecutionGraphToLassoProof (EQUIVALENT) 34.61/9.63 Converted SEGraph to 1 independent lasso. 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (6) 34.61/9.63 Obligation: 34.61/9.63 Lasso 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (7) Lasso2IRS (EQUIVALENT) 34.61/9.63 Transformed LLVM symbolic execution graph SCC into a rewrite problem. Log: 34.61/9.63 Generated rules. Obtained 45 rulesP rules: 34.61/9.63 f_153(v52, v53, v54, v55, v56, v57, v58, v62, 1, v59, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_154(v52, v53, v54, v55, v56, v57, v58, v62, 1, v59, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) :|: v62 < 0 34.61/9.63 f_154(v52, v53, v54, v55, v56, v57, v58, v62, 1, v59, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_156(v52, v53, v54, v55, v56, v57, v58, v62, 1, v59, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) :|: 0 = 0 34.61/9.63 f_156(v52, v53, v54, v55, v56, v57, v58, v62, 1, v59, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_158(v52, v53, v54, v55, v56, v57, v58, v62, 1, v59, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_158(v52, v53, v54, v55, v56, v57, v58, v62, 1, v59, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_160(v52, v53, v54, v55, v56, v57, v58, v62, 1, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) :|: 0 = 0 34.61/9.63 f_160(v52, v53, v54, v55, v56, v57, v58, v62, 1, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_161(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v63, v65, v66, v67, v68, v69, 0, 3, 2, 4) :|: 0 = 0 34.61/9.63 f_161(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v63, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_162(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v63, v65, v66, v67, v68, v69, 0, 3, 2, 4) :|: v71 = v62 + v64 34.61/9.63 f_162(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v63, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_163(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v63, v65, v66, v67, v68, v69, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_163(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v63, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_164(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v63, v66, v67, v68, v69, 0, 3, 2, 4) :|: 0 = 0 34.61/9.63 f_164(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v63, v66, v67, v68, v69, 0, 3, 2, 4) -> f_165(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v63, v66, v67, v68, v69, 0, 3, 2, 4) :|: v73 + 2 * v65 = 0 34.61/9.63 f_165(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v63, v66, v67, v68, v69, 0, 3, 2, 4) -> f_166(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v63, v66, v67, v68, v69, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_166(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v63, v66, v67, v68, v69, 0, 3, 2, 4) -> f_167(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v66, v67, v68, v69, 0, 3, 2, 4) :|: 0 = 0 34.61/9.63 f_167(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v66, v67, v68, v69, 0, 3, 2, 4) -> f_168(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v75, v66, v67, v68, v69, 0, 3, 2, 4) :|: v75 = 1 + v65 34.61/9.63 f_168(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v75, v66, v67, v68, v69, 0, 3, 2, 4) -> f_169(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v75, v66, v67, v68, v69, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_169(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v75, v66, v67, v68, v69, 0, 3, 2, 4) -> f_170(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v75, v66, v67, v68, v69, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_170(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v75, v66, v67, v68, v69, 0, 3, 2, 4) -> f_152(v52, v53, v54, v55, v56, v57, v58, v62, 1, v64, v71, v65, v73, v75, v66, v67, v68, v69, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_152(v52, v53, v54, v55, v56, v57, v58, v59, 1, v61, v62, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) -> f_153(v52, v53, v54, v55, v56, v57, v58, v62, 1, v59, v61, v63, v64, v65, v66, v67, v68, v69, 0, 3, 2, 4) :|: 0 = 0 34.61/9.63 f_84 -> f_85(v1, v2, 3, 1, 4) :|: 1 <= v1 && v2 = 3 + v1 && 4 <= v2 34.61/9.63 f_85(v1, v2, 3, 1, 4) -> f_86(v1, v3, v2, v4, 3, 1, 4) :|: 1 <= v3 && v4 = 3 + v3 && 4 <= v4 34.61/9.63 f_86(v1, v3, v2, v4, 3, 1, 4) -> f_87(v1, v3, v5, v2, v4, v6, 3, 1, 4) :|: 1 <= v5 && v6 = 3 + v5 && 4 <= v6 34.61/9.63 f_87(v1, v3, v5, v2, v4, v6, 3, 1, 4) -> f_88(v1, v3, v5, v7, v2, v4, v6, v8, 3, 1, 4) :|: 1 <= v7 && v8 = 3 + v7 && 4 <= v8 34.61/9.63 f_88(v1, v3, v5, v7, v2, v4, v6, v8, 3, 1, 4) -> f_89(v1, v3, v5, v7, v2, v4, v6, v8, 0, 3, 1, 4) :|: TRUE 34.61/9.63 f_89(v1, v3, v5, v7, v2, v4, v6, v8, 0, 3, 1, 4) -> f_90(v1, v3, v5, v7, v9, v2, v4, v6, v8, 0, 3, 1, 4) :|: TRUE 34.61/9.63 f_90(v1, v3, v5, v7, v9, v2, v4, v6, v8, 0, 3, 1, 4) -> f_91(v1, v3, v5, v7, v9, v2, v4, v6, v8, 0, 3, 1, 4) :|: TRUE 34.61/9.63 f_91(v1, v3, v5, v7, v9, v2, v4, v6, v8, 0, 3, 1, 4) -> f_92(v1, v3, v5, v7, v9, v11, v2, v4, v6, v8, 0, 3, 1, 4) :|: TRUE 34.61/9.63 f_92(v1, v3, v5, v7, v9, v11, v2, v4, v6, v8, 0, 3, 1, 4) -> f_93(v1, v3, v5, v7, v9, v11, v2, v4, v6, v8, 0, 3, 1, 4) :|: TRUE 34.61/9.63 f_93(v1, v3, v5, v7, v9, v11, v2, v4, v6, v8, 0, 3, 1, 4) -> f_94(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) :|: TRUE 34.61/9.63 f_94(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) -> f_95(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) :|: TRUE 34.61/9.63 f_95(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) -> f_96(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) :|: TRUE 34.61/9.63 f_96(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) -> f_97(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) :|: 0 = 0 34.61/9.63 f_97(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) -> f_98(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) :|: v9 < 0 34.61/9.63 f_98(v1, v3, v5, v7, v9, v11, v13, v2, v4, v6, v8, 0, 3, 1, 4) -> f_100(v1, v3, v5, v7, v9, v11, v13, 1, v2, v4, v6, v8, 0, 3, 4) :|: 0 = 0 34.61/9.63 f_100(v1, v3, v5, v7, v9, v11, v13, 1, v2, v4, v6, v8, 0, 3, 4) -> f_102(v1, v3, v5, v7, v9, v11, v13, 1, v2, v4, v6, v8, 0, 3, 4) :|: TRUE 34.61/9.63 f_102(v1, v3, v5, v7, v9, v11, v13, 1, v2, v4, v6, v8, 0, 3, 4) -> f_104(v1, v3, v5, v7, v9, v11, v13, 1, v2, v4, v6, v8, 0, 3, 4) :|: 0 = 0 34.61/9.63 f_104(v1, v3, v5, v7, v9, v11, v13, 1, v2, v4, v6, v8, 0, 3, 4) -> f_105(v1, v3, v5, v7, v9, v11, v13, 1, v2, v4, v6, v8, 0, 3, 4) :|: 0 = 0 34.61/9.63 f_105(v1, v3, v5, v7, v9, v11, v13, 1, v2, v4, v6, v8, 0, 3, 4) -> f_106(v1, v3, v5, v7, v9, v11, v13, 1, v15, v2, v4, v6, v8, 0, 3, 4) :|: v15 = v9 + v13 34.61/9.63 f_106(v1, v3, v5, v7, v9, v11, v13, 1, v15, v2, v4, v6, v8, 0, 3, 4) -> f_107(v1, v3, v5, v7, v9, v11, v13, 1, v15, v2, v4, v6, v8, 0, 3, 4) :|: TRUE 34.61/9.63 f_107(v1, v3, v5, v7, v9, v11, v13, 1, v15, v2, v4, v6, v8, 0, 3, 4) -> f_108(v1, v3, v5, v7, v9, v11, v13, 1, v15, v2, v4, v6, v8, 0, 3, 4) :|: 0 = 0 34.61/9.63 f_108(v1, v3, v5, v7, v9, v11, v13, 1, v15, v2, v4, v6, v8, 0, 3, 4) -> f_109(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v2, v4, v6, v8, 0, 3, 2, 4) :|: v17 + 2 * v11 = 0 34.61/9.63 f_109(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v2, v4, v6, v8, 0, 3, 2, 4) -> f_110(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v2, v4, v6, v8, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_110(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v2, v4, v6, v8, 0, 3, 2, 4) -> f_111(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v2, v4, v6, v8, 0, 3, 2, 4) :|: 0 = 0 34.61/9.63 f_111(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v2, v4, v6, v8, 0, 3, 2, 4) -> f_112(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v19, v2, v4, v6, v8, 0, 3, 2, 4) :|: v19 = 1 + v11 34.61/9.63 f_112(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v19, v2, v4, v6, v8, 0, 3, 2, 4) -> f_113(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v19, v2, v4, v6, v8, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_113(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v19, v2, v4, v6, v8, 0, 3, 2, 4) -> f_114(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v19, v2, v4, v6, v8, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_114(v1, v3, v5, v7, v9, v11, v13, 1, v15, v17, v19, v2, v4, v6, v8, 0, 3, 2, 4) -> f_133(v1, v3, v5, v7, v9, v11, v13, v9, 1, v13, v15, v11, v17, v19, v2, v4, v6, v8, 0, 3, 2, 4) :|: TRUE 34.61/9.63 f_133(v27, v28, v29, v30, v31, v32, v33, v34, 1, v36, v37, v38, v39, v40, v41, v42, v43, v44, 0, 3, 2, 4) -> f_152(v27, v28, v29, v30, v31, v32, v33, v34, 1, v36, v37, v38, v39, v40, v41, v42, v43, v44, 0, 3, 2, 4) :|: TRUE 34.61/9.63 Combined rules. Obtained 2 rulesP rules: 34.61/9.63 f_153(v52:0, v53:0, v54:0, v55:0, v56:0, v57:0, v58:0, v62:0, 1, v59:0, v61:0, v63:0, v64:0, v65:0, v66:0, v67:0, v68:0, v69:0, 0, 3, 2, 4) -> f_153(v52:0, v53:0, v54:0, v55:0, v56:0, v57:0, v58:0, v62:0 + v64:0, 1, v62:0, v64:0, v65:0, v73:0, 1 + v65:0, v66:0, v67:0, v68:0, v69:0, 0, 3, 2, 4) :|: v73:0 + 2 * v65:0 = 0 && v62:0 < 0 34.61/9.63 f_84 -> f_153(v1:0, v3:0, v5:0, v7:0, v9:0, v11:0, v13:0, v9:0 + v13:0, 1, v9:0, v13:0, v11:0, v17:0, 1 + v11:0, 3 + v1:0, 3 + v3:0, 3 + v5:0, 3 + v7:0, 0, 3, 2, 4) :|: v3:0 > 0 && v1:0 > 0 && v5:0 > 0 && v7:0 > 0 && v17:0 + 2 * v11:0 = 0 && v9:0 < 0 34.61/9.63 Filtered unneeded arguments: 34.61/9.63 f_153(x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12, x13, x14, x15, x16, x17, x18, x19, x20, x21, x22) -> f_153(x8, x13, x14) 34.61/9.63 Removed division, modulo operations, cleaned up constraints. Obtained 2 rules.P rules: 34.61/9.63 f_153(v62:0, v64:0, v65:0) -> f_153(v62:0 + v64:0, v73:0, 1 + v65:0) :|: v73:0 + 2 * v65:0 = 0 && v62:0 < 0 34.61/9.63 f_84 -> f_153(v9:0 + v13:0, v17:0, 1 + v11:0) :|: v17:0 + 2 * v11:0 = 0 && v9:0 < 0 34.61/9.63 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (8) 34.61/9.63 Obligation: 34.61/9.63 Rules: 34.61/9.63 f_153(v62:0, v64:0, v65:0) -> f_153(v62:0 + v64:0, v73:0, 1 + v65:0) :|: v73:0 + 2 * v65:0 = 0 && v62:0 < 0 34.61/9.63 f_84 -> f_153(v9:0 + v13:0, v17:0, 1 + v11:0) :|: v17:0 + 2 * v11:0 = 0 && v9:0 < 0 34.61/9.63 Start term: f_84 34.61/9.63 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (9) IRS2T2 (EQUIVALENT) 34.61/9.63 Transformed input IRS into an integer transition system.Used the following mapping from defined symbols to location IDs: 34.61/9.63 34.61/9.63 (f_153_3,1) 34.61/9.63 (f_84_3,2) 34.61/9.63 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (10) 34.61/9.63 Obligation: 34.61/9.63 START: 2; 34.61/9.63 34.61/9.63 FROM: 1; 34.61/9.63 oldX0 := x0; 34.61/9.63 oldX1 := x1; 34.61/9.63 oldX2 := x2; 34.61/9.63 oldX3 := nondet(); 34.61/9.63 assume(oldX3 + 2 * oldX2 = 0 && oldX0 < 0); 34.61/9.63 x0 := oldX0 + oldX1; 34.61/9.63 x1 := oldX3; 34.61/9.63 x2 := 1 + oldX2; 34.61/9.63 TO: 1; 34.61/9.63 34.61/9.63 FROM: 2; 34.61/9.63 oldX0 := x0; 34.61/9.63 oldX1 := x1; 34.61/9.63 oldX2 := x2; 34.61/9.63 oldX3 := nondet(); 34.61/9.63 oldX4 := nondet(); 34.61/9.63 oldX5 := nondet(); 34.61/9.63 oldX6 := nondet(); 34.61/9.63 assume(oldX5 + 2 * oldX6 = 0 && oldX3 < 0); 34.61/9.63 x0 := oldX3 + oldX4; 34.61/9.63 x1 := oldX5; 34.61/9.63 x2 := 1 + oldX6; 34.61/9.63 TO: 1; 34.61/9.63 34.61/9.63 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (11) T2 Underapproximation (COMPLETE) 34.61/9.63 Added the following guard statements: 34.61/9.63 34.61/9.63 34.61/9.63 34.61/9.63 Transition 1: 34.61/9.63 assume(x2 >= 0); 34.61/9.63 34.61/9.63 34.61/9.63 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (12) 34.61/9.63 Obligation: 34.61/9.63 START: 2; 34.61/9.63 34.61/9.63 FROM: 1; 34.61/9.63 oldX0 := x0; 34.61/9.63 oldX1 := x1; 34.61/9.63 oldX2 := x2; 34.61/9.63 oldX3 := nondet(); 34.61/9.63 assume(oldX3 + (x2 + x2) = 0 && x0 < 0); 34.61/9.63 x0 := x0 + x1; 34.61/9.63 x1 := oldX3; 34.61/9.63 assume(x2 >= 0); 34.61/9.63 x2 := x2 + 1; 34.61/9.63 TO: 1; 34.61/9.63 34.61/9.63 FROM: 2; 34.61/9.63 oldX0 := x0; 34.61/9.63 oldX1 := x1; 34.61/9.63 oldX2 := x2; 34.61/9.63 oldX3 := nondet(); 34.61/9.63 oldX4 := nondet(); 34.61/9.63 oldX5 := nondet(); 34.61/9.63 oldX6 := nondet(); 34.61/9.63 assume(oldX5 + (oldX6 + oldX6) = 0 && oldX3 < 0); 34.61/9.63 x0 := oldX3 + oldX4; 34.61/9.63 x1 := oldX5; 34.61/9.63 x2 := oldX6 + 1; 34.61/9.63 TO: 1; 34.61/9.63 34.61/9.63 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (13) T2 (COMPLETE) 34.61/9.63 Found this recurrent set for cutpoint 5: oldX3 <= -2 and -1 <= oldX6 and x1 <= -2 and 2 <= x2 and oldX3-oldX6 <= -1 and oldX6+oldX3 <= -3 and x1-oldX6 <= -1 and oldX6+x1 <= -3 and x1-oldX3 <= 0 and oldX3-x1 <= 0 and x1+oldX3 <= -4 and oldX3-x2 <= -4 and x2+oldX3 <= 0 and oldX6-x2 <= -3 and 1 <= x2+oldX6 and x1-x2 <= -4 and x2+x1 <= 0 and x0+1 <= 0 and -x2 <= 0 34.61/9.63 34.61/9.63 ---------------------------------------- 34.61/9.63 34.61/9.63 (14) 34.61/9.63 NO 34.61/9.66 EOF