When is U(X) a ring?

Abstract

In this short paper, we will show that the space of real valued uniformly continuous functions defined on a metric space (X,d) is a ring if and only if every subset A⊂ X has one of the following properties: A is Bourbaki-bounded, i.e., every uniformly continuous function on X is bounded on A. A contains an infinite uniformly isolated subset, i.e., there exist δ>0 and an infinite subset F⊂ A such that d(a,x)≥ δ for every a∈ F, x∈ X.