Topologization of sets endowed with an action of a monoid

Abstract

Given a set X and a family G of self-maps of X, we study the problem of the existence of a non-discrete Hausdorff topology on X with respect to which all functions f∈ G are continuous. A topology on X with this property is called a G-topology. The answer is given in terms of the Zariski G-topology ζG on X, that is, the topology generated by the subbase consisting of the sets \x∈ X:f(x) g(x)\ and \x∈ X:f(x) c\, where f,g∈ G and c∈ X. We prove that, for a countable monoid G⊂ XX, X admits a non-discrete Hausdorff G-topology if and only if the Zariski G-topology ζG is non-discrete; moreover, in this case, X admits 2 c hereditarily normal G-topologies.