Relaxation and optimization for linear-growth convex integral functionals under PDE constraints

Abstract

We give necessary and sufficient conditions for minimality of generalized minimizers for linear-growth functionals of the form \[ F[u] := ∫ f(x,u(x)) \, dx, u: ⊂ RN Rd, \] where u is an integrable function satisfying a general PDE constraint. Our analysis is based on two ideas: a relaxation argument into a subspace of the space of bounded vector-valued Radon measures M(; Rd), and the introduction of a set-valued pairing in M(; RN) × L∞(; RN). By these means we are able to show an intrinsic relation between minimizers of the relaxed problem and maximizers of its dual formulation also known as the saddle-point conditions. In particular, our results can be applied to relaxation and minimization problems in BV, BD.