Qualification conditions-free characterizations of the -subdifferential of convex integral functions

Abstract

We provide formulae for the -subdifferential of the integral function If(x):=∫T f(t,x) dμ(t), where the integrand f:T× X [-∞,+∞] is measurable in (t,x) and convex in x. The state variable lies in a locally convex space, possibly non-separable, while T is given a structure of a nonnegative complete σ-finite measure space (T,A,μ). The resulting characterizations are given in terms of the ε-subdifferential of the data functions involved in the integrand, f, without requiring any qualification conditions. We also derive new formulas when some usual continuity-type conditions are in force. These results are new even for the finite sum of convex functions and for the finite-dimensional setting.