On a locally compact monoid of cofinite partial isometries of N with adjoined zero

Abstract

Let CN be a monoid which is generated by the partial shift α n n+1 of the set of positive integers N and its inverse partial shift β n+1 n. In this paper we prove that if S is a submonoid of the monoid IN∞ of all partial cofinite isometries of positive integers which contains CN as a submonoid then every Hausdorff locally compact shift-continuous topology on S with adjoined zero is either compact or discrete. Also we show that the similar statement holds for a locally compact semitopological semigroup S with an adjoined compact ideal.

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