Upper bound for the first nonzero eigenvalue related to the p-Laplacian

Abstract

Let M be a closed hypersurface in \({\mathbb {R}}^{n}\) and \(\Omega \) be a bounded domain such that \(M= \partial \Omega \). In this article, we obtain an upper bound for the first nonzero eigenvalue of the following problems:

1. (1)

   Closed eigenvalue problem:

   $$\begin{aligned} \Delta _p u = \lambda _{p} \ |u|^{p-2} \ u \quad \text{ on } {M}. \end{aligned}$$
2. (2)

   Steklov eigenvalue problem:

   $$\begin{aligned} {\begin{array}{ll} \Delta _{p}u = 0 &{} \text{ in } \Omega ,\\ |\nabla u|^{p-2} \frac{\partial u}{\partial \nu } = \mu _{p} \ |u|^{p-2} \ u &{} \text{ on } M . \end{array}} \end{aligned}$$

These bounds are given in terms of the first nonzero eigenvalue of the usual Laplacian on the geodesic ball of the same volume as of \(\Omega \).

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