Non-trapping magnetic fields and Morrey-Campanato estimates for Schroedinger operators

Abstract

We prove some uniform in ε a priori estimates for solutions of the equation (∇-iA)2u-V(x)u+(λ iε)u=f, λ≥0, ε≠0. The estimates are obtained in terms of Morrey-Campanato norms, and can be used to prove absence of zero-resonances, in a suitable sense, for electromagnetic Hamiltonians. Precise conditions on the size of the trapping component of the magnetic field and the non repulsive component of the electric field are given.