Functionally countable subalgebras and some properties of Banaschewski compactification

Abstract

Let X be a zero-dimensional space and Cc(X) be the set of all continuous real valued functions on X with countable image. In this article we denote by CcK(X) (resp., Cc(X)) the set of all functions in Cc(X) with compact (resp., pseudocompact) support. First, we observe that CcK(X)=Ocβ0X X (resp., Cc(X)=Mcβ0X 0X). This implies that for an N-compact space X, the intersection of all free maximal ideals in Cc(X) equals to CcK(X), i.e., Mcβ0X X=CcK(X). Afterwards, by applying methods of functionally countable subalgebras, we observe some results in the remainder of Banaschewski compactification. It is shown that for a zero-dimensional non pseudocompact space X, the set β0X 0X has cardinality at least 220. Moreover, for a locally compact and N-compact space X, the remainder β0X X is an almost P-space. These results leads us to find a class of Parovicenko spaces in Banaschewski compactification os a non pseudocompact zero-dimensional space. We conclude with a theorem which gives a lower bound for the cellularity of subspaces β0X 0X and β0X X, whenever X is a zero-dimensional, locally compact space which is not pseudocompact.