New approaches to remote points

Abstract

For a given Tychonoff space X, a point p∈ β(X) X is called remote if p is not in the closure of any nowhere dense subset of X. In this paper, we characterize spaces with remote points in terms of certain topological ultrafilters, measures, and compact-like properties corresponding to the ideal consisting of nowhere dense sets. It is shown that the space of remote points is homeomorphic to a subspace of the Stone space taken over the smallest Boolean algebra containing all open and nowhere dense sets. Also, we show that the space of remote points of R is ω-bounded.