Schroedinger operators involving singular potentials and measure data

Abstract

We study the existence of solutions of the Dirichlet problem for the Schroedinger operator with measure data \ alignedat2 - u + Vu & = μ && in ,\\ u & = 0 && on ∂ . alignedat . We characterize the finite measures μ for which this problem has a solution for every nonnegative potential V in the Lebesgue space Lp() with 1 p N/2. The full answer can be expressed in terms of the W2,p capacity for p > 1, and the W1,2 (or Newtonian) capacity for p = 1. We then prove the existence of a solution of the problem above when V belongs to the real Hardy space H1() and μ is diffuse with respect to the W2,1 capacity.