Categorically closed countable semigroups

Abstract

In this paper we establish a connection between categorical closedness and topologizability of semigroups. In particular, for a class T\!1 S of T1 topological semigroups we prove that a countable semigroup X with finite-to-one shifts is injectively T\!1 S-closed if and only if X is T\!1S-nontopologizable in the sense that every T1 semigroup topology on X is discrete. Moreover, a countable cancellative semigroup X is absolutely T\!1 S-closed if and only if every homomorphic image of X is T\!1 S-nontopologizable. Also, we introduce and investigate a notion of a polybounded semigroup. It is proved that a countable semigroup X with finite-to-one shifts is polybounded if and only if X is T\!1 S-closed if and only if X is T\!z S-closed, where T\!z S is a class of zero-dimensional Tychonoff topological semigroups. We show that polyboundedness provides an automatic continuity of the inversion in T1 paratopological groups and prove that every cancellative polybounded semigroup is a group.