On the trace of Schr\"odinger heat kernels and regularity of potentials

Abstract

For the Schr\"odinger operator -g+V on a complete Riemannian manifold with real valued potential V of compact support, we establish a sharp equivalence between Sobolev regularity of V and the existence of finite-order asymptotic expansions as t→ 0 of the relative trace of the Schr\"odinger heat kernel. As an application, we generalize a result of S\`a Barreto and Zworski, concerning the existence of resonances on compact metric perturbations of Euclidean space, to the case of bounded measurable potentials.