Optimal control of nonlinear elliptic problems with sparsity

Abstract

We study the minimization of the cost functional \[ F(μ) = u - ud Lp() + α μ M(), \] where the controls μ are taken in the space of finite Borel measures and u ∈ W01, 1() satisfies the equation - u + g(u) = μ in the sense of distributions in for a given nondecreasing continuous function g : R R such that g(0) = 0. We prove that F has a minimizer for every desired state ud ∈ L1() and every control parameter α > 0. We then show that when ud is nonnegative or bounded, every minimizer of F has the same property.