Miminization of the first eigenvalue of the Dirichlet Laplacian with a small volume obstacle

Abstract

We consider the well-known shape optimization problem with spectral cost: minimizing the first eigenvalue of the Dirichlet Laplacian among all subdomains having prescribed volume and contained in a fixed box D; equivalently, we look for the best way to remove a compact set (obstacle) K⊂D of Lebesgue measure |K|=, 0<<|D|, in order to minimize the first Dirichlet eigenvalue of the set = D K. In the small volume regime 0, we prove that the optimal obstacles accumulate, in a suitable sense, to points of ∂ D where |∇ φ0| is minimal, where φ0 denotes the first eigenfunction of the Dirichlet Laplacian on D. Moreover, we provide a fairly detailed description of the convergence of the optimal eigenvalues, eigenfunctions and free boundaries. Our results are based on sharp estimates of the optimal eigenvalues, in terms of a suitable notion of relative capacity.