MAYBE * Step 1: UnsatPaths MAYBE + Considered Problem: Rules: 0. f2(A,B) -> f300(-1 + A,C) [A >= 2] (?,1) 1. f2(A,B) -> f2(-1 + A,B) [1 >= A] (?,1) 2. f3(A,B) -> f2(A,B) True (1,1) Signature: {(f2,2);(f3,2);(f300,2)} Flow Graph: [0->{},1->{0,1},2->{0,1}] + Applied Processor: UnsatPaths + Details: We remove following edges from the transition graph: [(1,0)] * Step 2: FromIts MAYBE + Considered Problem: Rules: 0. f2(A,B) -> f300(-1 + A,C) [A >= 2] (?,1) 1. f2(A,B) -> f2(-1 + A,B) [1 >= A] (?,1) 2. f3(A,B) -> f2(A,B) True (1,1) Signature: {(f2,2);(f3,2);(f300,2)} Flow Graph: [0->{},1->{1},2->{0,1}] + Applied Processor: FromIts + Details: () * Step 3: Unfold MAYBE + Considered Problem: Rules: f2(A,B) -> f300(-1 + A,C) [A >= 2] f2(A,B) -> f2(-1 + A,B) [1 >= A] f3(A,B) -> f2(A,B) True Signature: {(f2,2);(f3,2);(f300,2)} Rule Graph: [0->{},1->{1},2->{0,1}] + Applied Processor: Unfold + Details: () * Step 4: AddSinks MAYBE + Considered Problem: Rules: f2.0(A,B) -> f300.3(-1 + A,C) [A >= 2] f2.1(A,B) -> f2.1(-1 + A,B) [1 >= A] f3.2(A,B) -> f2.0(A,B) True f3.2(A,B) -> f2.1(A,B) True Signature: {(f2.0,2);(f2.1,2);(f3.2,2);(f300.3,2)} Rule Graph: [0->{},1->{1},2->{0},3->{1}] + Applied Processor: AddSinks + Details: () * Step 5: Failure MAYBE + Considered Problem: Rules: f2.0(A,B) -> f300.3(-1 + A,C) [A >= 2] f2.1(A,B) -> f2.1(-1 + A,B) [1 >= A] f3.2(A,B) -> f2.0(A,B) True f3.2(A,B) -> f2.1(A,B) True f2.1(A,B) -> exitus616(A,B) True f300.3(A,B) -> exitus616(A,B) True Signature: {(exitus616,2);(f2.0,2);(f2.1,2);(f3.2,2);(f300.3,2)} Rule Graph: [0->{5},1->{1,4},2->{0},3->{1}] + Applied Processor: Decompose Greedy + Details: We construct a looptree: P: [0,1,2,3,4,5] | `- p:[1] c: [] MAYBE