An isoperimetric result for the fundamental frequency via domain derivative

Abstract

The Faber-Krahn deficit δλ of an open bounded set is the normalized gap between the values that the first Dirichlet Laplacian eigenvalue achieves on and on the ball having same measure as . For any given family of open bounded sets of N (N 2) smoothly converging to a ball, it is well known that both δλ and the isoperimetric deficit δ P are vanishing quantities. It is known as well that, at least for convex sets, the ratio δ Pδ λ is bounded by below by some positive constant (see BNT,PW), and in this note, using the technique of the shape derivative, we provide the explicit optimal lower bound of such a ratio as δ P goes to zero.