A T0-Compactification Of A Tychonoff Space Using The Rings Of Baire One Functions

Abstract

In this article, we continue our study of Baire one functions on a topological space X, denoted by B1(X) and extend the well known M. H. Stones's theorem from C(X) to B1(X). Introducing the structure space of B1(X), it is observed that X may not be embedded inside this structure space. This observation inspired us to build a space M(B1(X))/, from the structure space of B1(X) and to show that X is densely embedded in M(B1(X))/. It is further established that it is a T0-compactification of X. Such compactification of X possesses the extension property for continuous functions, though it lacks Hausdorffness in general. Therefore, it is natural to search for condition(s) under which it becomes Hausdorff. In the last section, a set of necessary and sufficient conditions for such compactification to become a Stone-Ceck compatification, is finally arrived at.