Semiclassical estimates of the cut-off resolvent for trapping perturbations

Abstract

This paper is devoted to the study of a semiclassical "black box" operator P. We estimate the norm of its resolvent truncated near the trapped set by the norm of its resolvent truncated on rings far away from the origin. For z in the unphysical sheet with - h |ln h| < Im z < 0, we prove that this estimate holds with a constant h |Im z|-1 eC|Im z|/h. We also obtain analogous bounds for the resonances states of P. These results hold without any assumption on the trapped set neither any assumption on the multiplicity of the resonances.