Construction of nearly pseudocompactification

Abstract

A space is nearly pseudocompact if and only if X X is dense in β X X. If we denote K=clβ X( X X), then δ X=X(β X K) is referred by Henriksen and Rayburn hr80 as nearly pseudocompact extension of X. Henriksen and Rayburn studied the nearly pseudocompact extension using different properties of β X. In this paper our main motivation is to construct nearly pseudocompact extension of X independently and not using any kind of extension property of β X. An alternative construction of β X is made by taking the family of all z-ultrafilters on X and then topologized in a suitable way. In this paper we also adopted the similar idea of constructing the δ X from the scratch, taking the collection of all z-ultrafilters on X of some kind, called hz-ultrafilters, together with fixed z-ultrafilter and then be topologized in the similar way what we do in the construction of β X. We have further shown that the extension δ X is unique with respect to certain properties.