Multiple eigenvalues and the width

Abstract

We obtain the simplicity of the first Neumann eigenvalue of convex thin domain with boundary in Rn and compact thin manifolds with non-negative Ricci curvature. For convex thin domain in R2, we get the simplicity of the first k Neumann eigenvalues. The number k depends on the ratio of the corresponding width over the diameter of the domain. For convex thin domain in Rn, we obtain the eigenvalue comparison with collapsing segment.

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