Logical Methods in Computer Science (Dec 2009)

Infinitary Combinatory Reduction Systems: Confluence

  • Jeroen Ketema,
  • Jakob Grue Simonsen

DOI
https://doi.org/10.2168/LMCS-5(4:3)2009
Journal volume & issue
Vol. Volume 5, Issue 4

Abstract

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We study confluence in the setting of higher-order infinitary rewriting, in particular for infinitary Combinatory Reduction Systems (iCRSs). We prove that fully-extended, orthogonal iCRSs are confluent modulo identification of hypercollapsing subterms. As a corollary, we obtain that fully-extended, orthogonal iCRSs have the normal form property and the unique normal form property (with respect to reduction). We also show that, unlike the case in first-order infinitary rewriting, almost non-collapsing iCRSs are not necessarily confluent.

Keywords