Sharp spectral stability for a class of singularly perturbed pseudo-differential operators

Abstract

Let a(x,ξ) be a real Hörmander symbol of the type S0,00(Rd× Rd), let F be a smooth function with all its derivatives globally bounded, and let Kδ be the self-adjoint Weyl quantization of the perturbed symbols a(x+F(δ\, x),ξ), where |δ|≤ 1. First, we prove that the Hausdorff distance between the spectra of Kδ and K0 is bounded by |δ|, and we give examples where spectral gaps of this magnitude can open when δ≠ 0. Second, we show that the distance between the spectral edges of Kδ and K0 (and also the edges of the inner spectral gaps, as long as they remain open at δ=0) are of order |δ|, and give a precise dependence on the width of the spectral gaps.