Geometric inequalities between Dirichlet and Neumann eigenvalues

Abstract

Comparing Neumann and Dirichlet eigenvalues of the Laplacian on a bounded domain ⊂eqn is a topic that goes back at least to the work of P\'olya polya. We study the effect of the isoperimetric ratio of on the number N() of Neumann eigenvalues that do not exceed the first Dirichlet eigenvalue, proving that N() is bounded above and below by a constant multiple of the isoperimetric ratio in the case of convex domains. We also show that these estimates do not hold in the non-convex setting, addressing questions of Cox-MacLachlan-Steeves coxetal and Freitas freitas. Despite these counterexamples, we find similar estimates for polygonal domains in 2 as well as certain families of fiber bundles that asymptotically collapse onto their base spaces, the motivating examples being tubular neighborhoods of submanifolds.

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