Commutativity of integral quasi-arithmetic means on measure spaces

Abstract

Let (X, L, λ) and (Y, M, μ) be finite measure spaces for which there exist A ∈ L and B ∈ M with 0 < λ(A) < λ(X) and 0 < μ(B) < μ(Y), and let I⊂eq R be a non-empty interval. We prove that, if f and g are continuous bijections I R+, then the equation 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=c g for some c ∈ R+ (it is easy to see that the equation is well posed). An analogous, but essentially different, result, with f and g replaced by continuous injections I R and λ(X)=μ(Y)=1, was recently obtained in [Indag. Math. 27 (2016), 945-953].