On a conjectured reverse Faber-Krahn inequality for a Steklov-type Laplacian eigenvalue
Abstract
For a given bounded Lipschitz set , we consider a Steklov--type eigenvalue problem for the Laplacian operator whose solutions provide extremal functions for the compact embedding H1() L2(∂ ). We prove that a conjectured reverse Faber--Krahn inequality holds true at least in the class of Lipschitz sets which are "close" to a ball in a Hausdorff metric sense. The result implies that among sets of prescribed measure, balls are local minimizers of the embedding constant.
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