On the (growing) gap between Dirichlet and Neumann eigenvalues

Abstract

We provide an answer to a question raised by Levine and Weinberger in their 1986 paper concerning the difference between Dirichlet and Neumann eigenvalues of the Laplacian on bounded domains in Rn. More precisely, we show that for a certain class of domains there exists a sequence p(k) such that λk≥ μk+ p(k) for sufficiently large k. This sequence, which is given explicitly and is independent of the domain, grows with k1-1/n as k goes to infinity, which we conjecture to be optimal. We also prove the existence of a sequence, now not given explicitly and only of order k1-3/n but valid for bounded Lipschitz domains in mathbbRn (n≥4), for which a similar inequality holds for all k. We then frame these general results with some specific planar Euclidean examples such as rectangles and disks, for which we provide bounds valid for all eigenvalue orders.

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