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 where denote the eigenvalues of the Dirichlet Laplacian and the -dimensional Lebesgue measure. We prove that the topological boundary of a minimizer is composed of a relatively open regular part which is locally a graph of a function and a closed singular part, which is empty if , contains at most a finite number of isolated points if and has Hausdorff dimension smaller than if , where the natural number 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.
Cite
@article{arxiv.1609.01231,
title = {Regularity of the optimal sets for some spectral functionals},
author = {Dario Mazzoleni and Susanna Terracini and Bozhidar Velichkov},
journal= {arXiv preprint arXiv:1609.01231},
year = {2017}
}
Comments
32 pages, New version: a proof of the $C^\infty$ regularity (in the previous version it was only $C^{1,\alpha}$) of the regular part of the free boundary was added. Few typos and misprints corrected