A Robust Version of Convex Integral Functionals

Abstract

We study the pointwise supremum of convex integral functionals If,γ()= Q ( ∫ f(ω,(ω))Q(dω)-γ(Q)) on L∞(,F,P) where f:×R→R is a proper normal convex integrand, γ is a proper convex function on the set of probability measures absolutely continuous w.r.t. P, and the supremum is taken over all such measures. We give a pair of upper and lower bounds for the conjugate of If,γ as direct sums of a common regular part and respective singular parts; they coincide when dom(γ)=\P\ as Rockafellar's result, while both inequalities can generally be strict. We then investigate when the conjugate eliminates the singular measures, which a fortiori yields the equality in bounds, and its relation to other finer regularity properties of the original functional and of the conjugate.