Continuous mappings with null support

Abstract

Let X be a (topological) space and let I be an ideal in X, that is, a collection of subsets of X which contains all subsets of its elements and is closed under finite unions. The elements of I are called null. The space X is locally null if each x in X has a null neighborhood in X. Let Cb(X) denote the normed algebra of all continuous bounded real-valued mappings on X equipped with the supremum norm, C0(X) denote the subalgebra of Cb(X) consisting of elements vanishing at infinity and C00(X) the subalgebra of Cb(X) consisting of elements with compact support. We study the normed subalgebra C I00(X) of Cb(X) consisting of all f in Cb(X) whose support has a null neighborhood in X, and the Banach subalgebra C I0(X) of Cb(X) consisting of all f in Cb(X) such that |f|-1([1/n,∞)) has a null neighborhood in X for all positive integer n. We prove that if X is a normal locally null space then C I00(X) and C I0(X) are respectively isometrically isomorphic to C00(Y) and C0(Y) for a unique locally compact Hausdorff space Y; furthermore, C I00(X) is dense in C I0(X). We construct Y explicitly as a subspace of the Stone--Cech compactification β X of X. The space Y is locally compact (and countably compact, in certain cases), contains X densely, and in specific cases turns out to be familiar subspaces of β X. The known topological structure of Y enables us to establish several commutative Gelfand--Naimark type theorems and derive results not generally expected to be deducible from the standard Gelfand theory.