On the monoid of cofinite partial isometries of N with a bounded finite noise

Abstract

In the paper we study algebraic properties of the monoid IN∞g[j] of cofinite partial isometries of the set of positive integers N with the bounded finite noise j. For the monoids IN∞g[j] we prove counterparts of some classical results of Eberhart and Selden describing the closure of the bicyclic semigroup in a locally compact topological inverse semigroup. In particular we show that for any positive integer j every Hausdorff shift-continuous topology τ on IN∞g[j] is discrete and if IN∞g[j] is a proper dense subsemigroup of a Hausdorff semitopological semigroup S, then S IN∞g[j] is a closed ideal of S, and moreover if S is a topological inverse semigroup then S IN∞g[j] is a topological group. Also we describe the algebraic and topological structure of the closure of the monoid IN∞g[j] in a locally compact topological inverse semigroup.