Subcommutativity of integrals and quasi-arithmetic means

Abstract

Let (X, L, λ) and (Y, M, μ) be finite measure spaces for which there exist A ∈ L and B ∈ M with either 0 < λ(A) < 1 < λ(X) and 0 < μ(B) < μ(Y), or the other way around. In addition, let I ⊂eq R be a non-empty open interval, and suppose that f,g I R+ are homeo\-morphisms with g increasing. We prove that the functional inequality f-1\!(∫X f\!(g-1\!(∫Y g h\;dμ))d λ)\! g-1\!(∫Y g\!(f-1\!(∫X f h\;dλ))d μ) is satisfied by every L M-measurable simple function h: X × Y I if and only if f=a gb for some a,b ∈ R+ with b 1. An analogous characterization is given for probability spaces.