Lp continuity of eigenprojections for 2-d Dirichlet Laplacians under perturbations of the domain

Abstract

We generalise results by Lamberti and Lanza de Cristoforis (2005) concerning the continuity of projections onto eigenspaces of self-adjoint differential operators with compact inverses as the (spatial) domain of the functions is perturbed in R2. Our main case of interest is the Dirichlet Laplacian. We extend these results from bounds from H01 to H01 to bounds from Lp to Lp, under the assumption that (--1-z)-1 is Lp bounded when z lies outside of the spectrum of --1. We show that this assumption is met if the initial domain is a square or a rectangle.