Runtime Complexity (innermost) proof of /tmp/tmpcu28Gt/z26.xml

The Runtime Complexity (innermost) of the given CpxTRS could be proven to be BOUNDS(1, n^1).

0 CpxTRS

↳1 NestedDefinedSymbolProof (BOTH BOUNDS(ID, ID), 0 ms)

↳2 CpxTRS

    ↳3 CpxTrsMatchBoundsTAProof (⇔, 0 ms)

    ↳4 BOUNDS(1, n^1)

    ↳5 CpxTrsToCdtProof (BOTH BOUNDS(ID, ID), 0 ms)

    ↳6 CdtProblem

        ↳7 CdtUsableRulesProof (⇔, 0 ms)

        ↳8 CdtProblem

        ↳9 CdtRuleRemovalProof (UPPER BOUND(ADD(n^1)), 46 ms)

        ↳10 CdtProblem

        ↳11 SIsEmptyProof (BOTH BOUNDS(ID, ID), 0 ms)

        ↳12 BOUNDS(1, 1)

(0) Obligation:

The Runtime Complexity (innermost) of the given CpxTRS could be proven to be BOUNDS(1, n^1).

The TRS R consists of the following rules:

a(a(f(x, y))) → f(a(b(a(b(a(x))))), a(b(a(b(a(y))))))
f(a(x), a(y)) → a(f(x, y))
f(b(x), b(y)) → b(f(x, y))

Rewrite Strategy: INNERMOST

(1) NestedDefinedSymbolProof (BOTH BOUNDS(ID, ID) transformation)

The TRS does not nest defined symbols.
Hence, the left-hand sides of the following rules are not basic-reachable and can be removed:
a(a(f(x, y))) → f(a(b(a(b(a(x))))), a(b(a(b(a(y))))))
f(a(x), a(y)) → a(f(x, y))

(2) Obligation:

The Runtime Complexity (innermost) of the given CpxTRS could be proven to be BOUNDS(1, n^1).

The TRS R consists of the following rules:

f(b(x), b(y)) → b(f(x, y))

Rewrite Strategy: INNERMOST

(3) CpxTrsMatchBoundsTAProof (EQUIVALENT transformation)

A linear upper bound on the runtime complexity of the TRS R could be shown with a Match-Bound[TAB_LEFTLINEAR,TAB_NONLEFTLINEAR] (for contructor-based start-terms) of 1.

The compatible tree automaton used to show the Match-Boundedness (for constructor-based start-terms) is represented by:
final states : [1]
transitions:
b0(0) → 0
f0(0, 0) → 1
f1(0, 0) → 2
b1(2) → 1
b1(2) → 2

(4) BOUNDS(1, n^1)

(5) CpxTrsToCdtProof (BOTH BOUNDS(ID, ID) transformation)

Converted Cpx (relative) TRS to CDT

(6) Obligation:

Complexity Dependency Tuples Problem
Rules:

f(b(z0), b(z1)) → b(f(z0, z1))

Tuples:

F(b(z0), b(z1)) → c(F(z0, z1))

S tuples:

F(b(z0), b(z1)) → c(F(z0, z1))

K tuples:none
Defined Rule Symbols:

f

Defined Pair Symbols:

F

Compound Symbols:

c

(7) CdtUsableRulesProof (EQUIVALENT transformation)

The following rules are not usable and were removed:

f(b(z0), b(z1)) → b(f(z0, z1))

(8) Obligation:

Complexity Dependency Tuples Problem
Rules:none
Tuples:

F(b(z0), b(z1)) → c(F(z0, z1))

S tuples:

F(b(z0), b(z1)) → c(F(z0, z1))

K tuples:none
Defined Rule Symbols:none

Defined Pair Symbols:

F

Compound Symbols:

c

(9) CdtRuleRemovalProof (UPPER BOUND(ADD(n^1)) transformation)

Found a reduction pair which oriented the following tuples strictly. Hence they can be removed from S.

F(b(z0), b(z1)) → c(F(z0, z1))

We considered the (Usable) Rules:none
And the Tuples:

F(b(z0), b(z1)) → c(F(z0, z1))

The order we found is given by the following interpretation:
Polynomial interpretation :

POL(F(x₁, x₂)) = x₂
POL(b(x₁)) = [1] + x₁
POL(c(x₁)) = x₁

(10) Obligation:

Complexity Dependency Tuples Problem
Rules:none
Tuples:

F(b(z0), b(z1)) → c(F(z0, z1))

S tuples:none
K tuples:

F(b(z0), b(z1)) → c(F(z0, z1))

Defined Rule Symbols:none

Defined Pair Symbols:

F

Compound Symbols:

c

(11) SIsEmptyProof (BOTH BOUNDS(ID, ID) transformation)

The set S is empty

(0) Obligation:

(1) NestedDefinedSymbolProof (BOTH BOUNDS(ID, ID) transformation)

(2) Obligation:

(3) CpxTrsMatchBoundsTAProof (EQUIVALENT transformation)

(4) BOUNDS(1, n^1)

(5) CpxTrsToCdtProof (BOTH BOUNDS(ID, ID) transformation)

(6) Obligation:

(7) CdtUsableRulesProof (EQUIVALENT transformation)

(8) Obligation:

(9) CdtRuleRemovalProof (UPPER BOUND(ADD(n^1)) transformation)

(10) Obligation:

(11) SIsEmptyProof (BOTH BOUNDS(ID, ID) transformation)

(12) BOUNDS(1, 1)