Estimates for the first and second Steklov-Dirichlet eigenvalues

Abstract

In this paper, we deal with the Steklov-Dirichlet eigenvalue problem for the Laplacian in annular domains. More precisely, we consider r = 0 Br, where 0 ⊂ Rn, n ≥ 2, is an open, bounded set with a Lipschitz boundary, and Br is the ball centered at the origin with radius r > 0, such that Br ⊂ 0. In the first part of the paper, we focus on the first Steklov-Dirichlet eigenvalue σ1(r) and prove that the sequence of corresponding normalized eigenfunctions converges to a particular constant as r 0+. This will allow us to prove an isoperimetric inequality for σ1(r) when r is small enough, under a measure constraint. The second part is focused on the second Steklov-Dirichlet eigenvalue σ2(r). We prove that it converges to the first non-trivial Steklov eigenvalue σ1(0) of the non-perforated domain 0. This result, together with the Brock and Weinstock inequalities, respectively, allows us to prove two isoperimetric inequalities for small holes.