Compactness of integral operators and uniform integrability on measure spaces

Abstract

Let (E, E,μ) be a measure space and G E× E [0,∞] be measurable. Moreover, let F\!ui denote the set of all q∈ E+ (measurable numerical functions q 0 on E) such that \G(x,·)q x∈ E\ is uniformly integrable, and let F\!co denote the set of all q∈ E+ such that the mapping f G(fq) :=∫ G(·,y) f(y) q(y)\,dμ(y) is a compact operator on the space Eb of bounded measurable functions on E (equipped with the sup-norm). It is shown that F\!ui= F\!co provided both F\!ui and F\!co contain strictly positive functions.