Lipschitz regularity of the eigenfunctions on optimal domains

Abstract

We study the optimal sets ⊂Rd for spectral functionals F(λ1(),…,λp()), which are bi-Lipschitz with respect to each of the eigenvalues λ1(),…,λp() of the Dirichlet Laplacian on , a prototype being the problem \λ1()+…+ λp()\;:\;⊂Rd,\ ||=1\. We prove the Lipschitz regularity of the eigenfunctions u1,…,up of the Dirichlet Laplacian on the optimal set * and, as a corollary, we deduce that * is open. For functionals depending only on a generic subset of the spectrum, as for example λk() or λk1()+…+λkp(), our result proves only the existence of a Lipschitz continuous eigenfunction in correspondence to each of the eigenvalues involved.