Quantitative stability control of the full spectrum of the Dirichlet Laplacian by the second eigenvalue

Abstract

Let ⊂ Rd be an open set of finite measure and let be a disjoint union of two balls of half measure. We study the stability of the full Dirichlet spectrum of when its second eigenvalue is close to the second eigenvalue of . Precisely, for every integer k 1, we provide a quantitative control of the difference |λk()-λk()| by the variation of the second eigenvalue C(d,k)(λ2()-λ2())α, for a suitable exponent α and a positive constant C(d,k) depending only on the dimension of the space and the index k. We are able to find such an estimate for general k and arbitrary with α =αd/(d+1)2 where α2 = 1/2 and 0<αd<1 in higher dimensions. In the particular case where λk() λk(), we can improve the inequality and find an estimate with the sharp exponent α = 1/2.