Regularity of Minimizers of Shape Optimization Problems involving Perimeter

Abstract

We prove existence and regularity of optimal shapes for the problem\P()+G():\ ⊂ D,\ ||=m\,where P denotes the perimeter, |·| is the volume, and the functional G is either one of the following:ulli the Dirichlet energy E\f, with respect to a (possibly sign-changing) function f∈ Lp;/lilia spectral functional of the form F(λ\1,…,λ\k), where λ\k is the kth eigenvalue of the Dirichlet Laplacian and F:Rk is Lipschitz continuous and increasing in each variable./li/ulThe domain D is the whole space Rd or a bounded domain. We also give general assumptions on the functional G so that the result remains valid.