A Fenchel-Moreau theorem for L0-valued functions

Abstract

We establish a Fenchel-Moreau type theorem for proper convex functions f X L0, where (X, Y, ·,· ) is a dual pair of Banach spaces and L0 is the space of all extended real-valued functions on a σ-finite measure space. We introduce the concept of stable lower semi-continuity which is shown to be equivalent to the existence of a dual representation f(x)=y ∈ L0(Y) \ x, y - f(y)\, x∈ X, where L0(Y) is the space of all strongly measurable functions with values in Y, and ·,· is understood pointwise almost everywhere. The proof is based on a conditional extension result and conditional functional analysis.