Termination proofs for term rewriting systems by lexicographic path orderings imply multiply recursive derivation lengths

AbstractIt is shown that a termination proof for a term rewriting system using a lexicographic path ordering yields a multiply recursive bound on the length of derivations, measured in the depth of the starting term. This result is essentially optimal since for every multiply recursive function ƒ a rewrite system (which reduces under the lexicographic path ordering) can be found such that its derivation length cannot be bounded by ƒ