A reverse quantitative isoperimetric type inequality for the Dirichlet Laplacian

Abstract

A stability result in terms of the perimeter is obtained for the first Dirichlet eigenvalue of the Laplacian operator. In particular, we prove that, once we fix the dimension n≥2, there exists a constant c>0, depending only on n, such that, for every ⊂Rn open, bounded and convex set with volume equal to the volume of a ball B with radius 1, it holds equation* λ1()-λ1(B)≥ c(P()-P(B) )2, equation* where by λ1(·) we denote the first Dirichlet eigenvalue of a set and by P(·) its perimeter. The hearth of the present paper is a sharp estimate of the Fraenkel asymmetry in terms of the perimeter.