YES proof of prog.inttrs # AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty Termination of the given IRSwT could be proven: (0) IRSwT (1) IRSFormatTransformerProof [EQUIVALENT, 0 ms] (2) IRSwT (3) IRSwTTerminationDigraphProof [EQUIVALENT, 139 ms] (4) IRSwT (5) IntTRSCompressionProof [EQUIVALENT, 0 ms] (6) IRSwT (7) TempFilterProof [SOUND, 52 ms] (8) IntTRS (9) PolynomialOrderProcessor [EQUIVALENT, 16 ms] (10) IntTRS (11) RankingReductionPairProof [EQUIVALENT, 0 ms] (12) YES ---------------------------------------- (0) Obligation: Rules: f1_0_main_Load(arg1, arg2) -> f151_0_main_LT(arg1P, arg2P) :|: 0 <= arg1 - 1 && -1 <= arg1P - 1 && -1 <= arg2 - 1 f151_0_main_LT(x, x1) -> f192_0_main_LT(x2, x3) :|: 1 = x3 && x + 1 = x2 && -1 <= x - 1 f192_0_main_LT(x4, x5) -> f192_0_main_LT(x6, x7) :|: x5 + 1 = x7 && x4 = x6 && x5 <= x4 f192_0_main_LT(x8, x9) -> f151_0_main_LT(x10, x11) :|: x8 - 2 = x10 && x8 <= x9 - 1 && 0 <= x8 - 1 __init(x12, x13) -> f1_0_main_Load(x14, x15) :|: 0 <= 0 Start term: __init(arg1, arg2) ---------------------------------------- (1) IRSFormatTransformerProof (EQUIVALENT) Reformatted IRS to match normalized format (transformed away non-linear left-hand sides, !=, / and %). ---------------------------------------- (2) Obligation: Rules: f1_0_main_Load(arg1, arg2) -> f151_0_main_LT(arg1P, arg2P) :|: 0 <= arg1 - 1 && -1 <= arg1P - 1 && -1 <= arg2 - 1 f151_0_main_LT(x, x1) -> f192_0_main_LT(x2, x3) :|: 1 = x3 && x + 1 = x2 && -1 <= x - 1 f192_0_main_LT(x4, x5) -> f192_0_main_LT(x6, x7) :|: x5 + 1 = x7 && x4 = x6 && x5 <= x4 f192_0_main_LT(x8, x9) -> f151_0_main_LT(x10, x11) :|: x8 - 2 = x10 && x8 <= x9 - 1 && 0 <= x8 - 1 __init(x12, x13) -> f1_0_main_Load(x14, x15) :|: 0 <= 0 Start term: __init(arg1, arg2) ---------------------------------------- (3) IRSwTTerminationDigraphProof (EQUIVALENT) Constructed termination digraph! Nodes: (1) f1_0_main_Load(arg1, arg2) -> f151_0_main_LT(arg1P, arg2P) :|: 0 <= arg1 - 1 && -1 <= arg1P - 1 && -1 <= arg2 - 1 (2) f151_0_main_LT(x, x1) -> f192_0_main_LT(x2, x3) :|: 1 = x3 && x + 1 = x2 && -1 <= x - 1 (3) f192_0_main_LT(x4, x5) -> f192_0_main_LT(x6, x7) :|: x5 + 1 = x7 && x4 = x6 && x5 <= x4 (4) f192_0_main_LT(x8, x9) -> f151_0_main_LT(x10, x11) :|: x8 - 2 = x10 && x8 <= x9 - 1 && 0 <= x8 - 1 (5) __init(x12, x13) -> f1_0_main_Load(x14, x15) :|: 0 <= 0 Arcs: (1) -> (2) (2) -> (3) (3) -> (3), (4) (4) -> (2) (5) -> (1) This digraph is fully evaluated! ---------------------------------------- (4) Obligation: Termination digraph: Nodes: (1) f151_0_main_LT(x, x1) -> f192_0_main_LT(x2, x3) :|: 1 = x3 && x + 1 = x2 && -1 <= x - 1 (2) f192_0_main_LT(x8, x9) -> f151_0_main_LT(x10, x11) :|: x8 - 2 = x10 && x8 <= x9 - 1 && 0 <= x8 - 1 (3) f192_0_main_LT(x4, x5) -> f192_0_main_LT(x6, x7) :|: x5 + 1 = x7 && x4 = x6 && x5 <= x4 Arcs: (1) -> (3) (2) -> (1) (3) -> (2), (3) This digraph is fully evaluated! ---------------------------------------- (5) IntTRSCompressionProof (EQUIVALENT) Compressed rules. ---------------------------------------- (6) Obligation: Rules: f192_0_main_LT(x4:0, x5:0) -> f192_0_main_LT(x4:0, x5:0 + 1) :|: x5:0 <= x4:0 f192_0_main_LT(x8:0, x9:0) -> f192_0_main_LT(x8:0 - 1, 1) :|: x9:0 - 1 >= x8:0 && x8:0 > 1 ---------------------------------------- (7) TempFilterProof (SOUND) Used the following sort dictionary for filtering: f192_0_main_LT(INTEGER, VARIABLE) Replaced non-predefined constructor symbols by 0. ---------------------------------------- (8) Obligation: Rules: f192_0_main_LT(x4:0, x5:0) -> f192_0_main_LT(x4:0, c) :|: c = x5:0 + 1 && x5:0 <= x4:0 f192_0_main_LT(x8:0, x9:0) -> f192_0_main_LT(c1, c2) :|: c2 = 1 && c1 = x8:0 - 1 && (x9:0 - 1 >= x8:0 && x8:0 > 1) ---------------------------------------- (9) PolynomialOrderProcessor (EQUIVALENT) Found the following polynomial interpretation: [f192_0_main_LT(x, x1)] = -1 + x The following rules are decreasing: f192_0_main_LT(x8:0, x9:0) -> f192_0_main_LT(c1, c2) :|: c2 = 1 && c1 = x8:0 - 1 && (x9:0 - 1 >= x8:0 && x8:0 > 1) The following rules are bounded: f192_0_main_LT(x8:0, x9:0) -> f192_0_main_LT(c1, c2) :|: c2 = 1 && c1 = x8:0 - 1 && (x9:0 - 1 >= x8:0 && x8:0 > 1) ---------------------------------------- (10) Obligation: Rules: f192_0_main_LT(x4:0, x5:0) -> f192_0_main_LT(x4:0, c) :|: c = x5:0 + 1 && x5:0 <= x4:0 ---------------------------------------- (11) RankingReductionPairProof (EQUIVALENT) Interpretation: [ f192_0_main_LT ] = -1*f192_0_main_LT_2 + f192_0_main_LT_1 The following rules are decreasing: f192_0_main_LT(x4:0, x5:0) -> f192_0_main_LT(x4:0, c) :|: c = x5:0 + 1 && x5:0 <= x4:0 The following rules are bounded: f192_0_main_LT(x4:0, x5:0) -> f192_0_main_LT(x4:0, c) :|: c = x5:0 + 1 && x5:0 <= x4:0 ---------------------------------------- (12) YES