One-point extensions of locally compact paracompact spaces

Abstract

A space Y is called an extension of a space X if Y contains X as a dense subspace. Two extensions of X are said to be equivalent if there is a homeomorphism between them which fixes X point-wise. For two (equivalence classes of) extensions Y and Y' of X let Y≤ Y' if there is a continuous function of Y' into Y which fixes X point-wise. An extension Y of X is called a one-point extension if Y X is a singleton. An extension Y of X is called first-countable if Y is first-countable at points of Y X. Let P be a topological property. An extension Y of X is called a P-extension if it has P. In this article, for a given locally compact paracompact space X, we consider the two classes of one-point Cech-complete P-extensions of X and one-point first-countable locally- P extensions of X, and we study their order-structures, by relating them to the topology of a certain subspace of the outgrowth β X X. Here P is subject to some requirements and include σ-compactness and the Lindel\"of property as special cases.