Resonances for random highly oscillatory potentials

Abstract

We study discrete spectral quantities associated to Schr\"odinger operators of the form -Rd+VN, d odd. The potential VN models a highly disordered crystal; it varies randomly at scale N-1 1. We use perturbation analysis to obtain almost sure convergence of the eigenvalues and scattering resonances of -Rd+VN as N → ∞. We identify a stochastic and a deterministic regime for the speed of convergence. The type of regime depends whether the low frequencies effects due to large deviations overcome the (deterministic) constructive interference between highly oscillatory terms.