Scattering resonances for highly oscillatory potentials

Abstract

We study resonances of compactly supported potentials V = W ( x, x/ ) where W : Rd × Rd / ( 2π Z) d C , d odd. That means that V is a sum of a slowly varying potential, W0 ( x) , and one oscillating at frequency 1/. For W0 0 we prove that there are no resonances above the line Im λ = -A (-1), except possibly a simple resonance of modulus 2, when d=1. We show that this result is optimal by constructing a one-dimensional example. In the case when W0 ≠ 0 we prove that resonances in fixed strips admit an expansion in powers of . The argument provides a method for computing the coefficients of the expansion. In particular we produce an effective potential converging uniformly to W0 as → 0 and whose resonances approach resonances of V modulo O(4).