On semitopological interassociates of the bicyclic monoid

Abstract

Semitopological interassociates Cm,n of the bicyclic semigroup C(p,q) are studied. In particular, we show that for arbitrary non-negative integers m, n and every Hausdorff topology τ on Cm,n such that (Cm,n,τ) is a semitopological semigroup, is discrete. Also, we prove that if an interassociate of the bicyclic monoid Cm,n is a dense subsemigroup of a Hausdorff semitopological semigroup (S,·) and I=SCm,n≠ then I is a two-sided ideal of the semigroup S and show that for arbitrary non-negative integers m, n, any Hausdorff locally compact semitopological semigroup Cm,n0=Cm,n\0\ is either discrete or compact.