On the Variety of Hyperspace Selections

Abstract

If f is a continuous selection for the Vietoris hyperspace F(X) of the nonempty closed subsets of a space X, then the point p=f(X)∈ X is not as arbitrary as it might seem at first glance. In fact, the set Ocs(X) of all these points reveals certain information about the variety of Vietoris continuous selections for F(X). Thus, for a connected space X, we will show that every point p∈ Ocs(X) is not only noncut, but also an endpoint of X. Another result of this paper is that in an arbitrary topological space X, the closure of the set Ocs(X) is always a totally disconnected subset. Furthermore, we will also show that Ocs(X) is a closed subset of every first countable totally disconnected space X.