Regularity of the optimal sets for some spectral functionals

Abstract

In this paper we study the regularity of the optimal sets for the shape optimization problem \[ \λ1()+…+λk()\ :\ ⊂Rd,\ open\ ,\ ||=1\, \] where λ1(·),…,λk(·) denote the eigenvalues of the Dirichlet Laplacian and |·| the d-dimensional Lebesgue measure. We prove that the topological boundary of a minimizer k* is composed of a relatively open regular part which is locally a graph of a C1,α function and a closed singular part, which is empty if d<d*, contains at most a finite number of isolated points if d=d* and has Hausdorff dimension smaller than (d-d*) if d>d*, where the natural number d*∈[5,7] is the smallest dimension at which minimizing one-phase free boundaries admit singularities. To achieve our goal, as an auxiliary result, we shall extend for the first time the known regularity theory for the one-phase free boundary problem to the vector-valued case.