Unique Normal Forms in Infinitary Weakly Orthogonal Term Rewriting (0911.1009v1)

Abstract: The theory of finite and infinitary term rewriting is extensively developed for orthogonal rewrite systems, but to a lesser degree for weakly orthogonal rewrite systems. In this note we present some contributions to the latter case of weak orthogonality, where critial pairs are admitted provided they are trivial. We start with a refinement of the by now classical Compression Lemma, as a tool for establishing infinitary confluence, and hence the property of unique infinitary normal forms, for the case of weakly orthogonal TRSs that do not contain collapsing rewrite rules. That this restriction of collapse-freeness is crucial, is shown in a elaboration of a simple TRS which is weakly orthogonal, but has two collapsing rules. It turns out that all the usual theory breaks down dramatically. We conclude with establishing a positive fact: the diamond property for infinitary developments for weakly orthogonal TRSs, by means of a detailed analysis initiated by van Oostrom for the finite case.