Quantitative Resolvent and Eigenfunction Stability for the Faber-Krahn Inequality
Abstract
For a bounded open set ⊂ Rn with the same volume as the unit ball, the classical Faber-Krahn inequality says that the first Dirichlet eigenvalue λ1() of the Laplacian is at least that of the unit ball B. We prove that the deficit λ1()- λ1(B) in the Faber-Krahn inequality controls the square of the distance between the resolvent operator (-)-1 for the Dirichlet Laplacian on and the resolvent operator on the nearest unit ball B(x). The distance is measured by the operator norm from L∞ to L2. As a main application, we show that the Faber-Krahn deficit λ1()- λ1(B) controls the squared L2 norm between kth eigenfunctions on and B(x) for every k ∈ N. In both of these main theorems, the quadratic power is optimal.
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