Resonance-free regions for diffractive trapping by conormal potentials

Abstract

We consider the Schr\"odinger operator \[ P=h2 g + V \] on Rn equipped with a metric g that is Euclidean outside a compact set. The real-valued potential V is assumed to be compactly supported and smooth except at conormal singularities of order -1-α along a compact hypersurface Y. For α>2 (or even α>1 if the classical flow is unique), we show that if E0 is a non-trapping energy for the classical flow, then the operator P has no resonances in a region \[ [E0 - δ, E0 + δ] - i[0,0 h (1/h)]. \] The constant 0 is explicit in terms of α and dynamical quantities. We also show that the size of this resonance-free region is optimal for the class of piecewise-smooth potentials on the line.