Lieb-Thirring type inequalities for non self-adjoint perturbations of magnetic Schr\"odinger operators

Abstract

Let H := H0 + V and H := H0, + V be respectively perturbations of the free Schr\"odinger operators H0 on L2(R2d+1) and H0, on L2(R2d), d ≥ 1 with constant magnetic field of strength b>0, and V is a complex relatively compact perturbation. We prove Lieb-Thirring type inequalities for the discrete spectrum of H and H. In particular, these estimates give a\, priori information on the distribution of the discrete eigenvalues around the Landau levels of the operator, and describe how fast sequences of eigenvalues converge.