Globalization of confluent partial actions on topological and metric spaces

Michael Megrelishvili, Lutz Schröder

Research output: Contribution to journalArticlepeer-review

27 Scopus citations

Abstract

We generalize Exel's notion of partial group action to monoids. For partial monoid actions that can be defined by means of suitably well-behaved systems of generators and relations, we employ classical rewriting theory in order to describe the universal induced global action on an extended set. This universal action can be lifted to the setting of topological spaces and continuous maps, as well as to that of metric spaces and non-expansive maps. Well-known constructions such as Shimrat's homogeneous extension are special cases of this construction. We investigate various properties of the arising spaces in relation to the original space; in particular, we prove embedding theorems and preservation properties concerning separation axioms and dimension. These results imply that every normal (metric) space can be embedded into a normal (metrically) ultrahomogeneous space of the same dimension and cardinality.

Original languageEnglish
Pages (from-to)119-145
Number of pages27
JournalTopology and its Applications
Volume145
Issue number1-3
DOIs
StatePublished - 28 Nov 2004

Keywords

  • Globalization
  • Partial action
  • Rewriting
  • Ultrahomogeneous space

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