WORST_CASE(Omega(n^1),O(n^1)) * Step 1: Sum WORST_CASE(Omega(n^1),O(n^1)) + Considered Problem: - Strict TRS: a(b(x)) -> b(b(a(x))) - Signature: {a/1} / {b/1} - Obligation: innermost runtime complexity wrt. defined symbols {a} and constructors {b} + Applied Processor: Sum {left = someStrategy, right = someStrategy} + Details: () ** Step 1.a:1: DecreasingLoops WORST_CASE(Omega(n^1),?) + Considered Problem: - Strict TRS: a(b(x)) -> b(b(a(x))) - Signature: {a/1} / {b/1} - Obligation: innermost runtime complexity wrt. defined symbols {a} and constructors {b} + Applied Processor: DecreasingLoops {bound = AnyLoop, narrow = 10} + Details: The system has following decreasing Loops: a(x){x -> b(x)} = a(b(x)) ->^+ b(b(a(x))) = C[a(x) = a(x){}] ** Step 1.b:1: NaturalPI WORST_CASE(?,O(n^1)) + Considered Problem: - Strict TRS: a(b(x)) -> b(b(a(x))) - Signature: {a/1} / {b/1} - Obligation: innermost runtime complexity wrt. defined symbols {a} and constructors {b} + Applied Processor: NaturalPI {shape = Linear, restrict = Restrict, uargs = UArgs, urules = URules, selector = Just any strict-rules} + Details: We apply a polynomial interpretation of kind constructor-based(linear): The following argument positions are considered usable: uargs(b) = {1} Following symbols are considered usable: {a} TcT has computed the following interpretation: p(a) = 2 + 6*x1 p(b) = 2 + x1 Following rules are strictly oriented: a(b(x)) = 14 + 6*x > 6 + 6*x = b(b(a(x))) Following rules are (at-least) weakly oriented: ** Step 1.b:2: EmptyProcessor WORST_CASE(?,O(1)) + Considered Problem: - Weak TRS: a(b(x)) -> b(b(a(x))) - Signature: {a/1} / {b/1} - Obligation: innermost runtime complexity wrt. defined symbols {a} and constructors {b} + Applied Processor: EmptyProcessor + Details: The problem is already closed. The intended complexity is O(1). WORST_CASE(Omega(n^1),O(n^1))