Bounds for Eigenvalue Sums of Schr\"odinger Operators with Complex Radial Potentials

Abstract

We consider eigenvalue sums of Schr\"odinger operators -+V on L2(d) with complex radial potentials V∈ Lq(d), q<d. We prove quantitative bounds on the distribution of the eigenvlaues in terms of the Lq norm of V. A consequence of our bounds is that, if the eigenvlaues (zj) accumulates to a point in (0,∞), then ( zj) is summable. The key technical tools are resolvent estimates in Schatten spaces. We show that these resolvent estimates follow from spectral measure estimates by an epsilon removal argument.