THE EIGENVALUE PROBLEM FOR THE LAPLACIAN EQUATIONS

doi:10.1016/S0252-9602(07)60033-2

Acta mathematica scientia,Series B

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THE EIGENVALUE PROBLEM FOR THE LAPLACIAN EQUATIONS

Shao Zhiqiang; Hong Jiaxing

Department of Mathematics, Fuzhou University, Fuzhou 350002, China

Received:2004-10-13 Revised:2005-09-27 Online:2007-04-20 Published:2007-04-20
Contact: Shao Zhiqiang

Abstract

Abstract:

This article studies the Dirichlet eigenvalue problem for the Laplacian equations △u=-λu, $x\in \Omega$, $u=0$, $x\in\partial\Omega$, where $\Omega\subset R^{n}$ is a smooth bounded convex domain. By using the method of appropriate barrier function combined with the maximum principle, authors obtain a sharp lower bound of the difference of the first two eigenvalues for the Dirichlet eigenvalue problem. This study improves the result of S.T. Yau et al.

Key words: Dirichlet eigenvalue problem, gradient estimate, maximum principle, barrier function

CLC Number:

35P30

Shao Zhiqiang; Hong Jiaxing. THE EIGENVALUE PROBLEM FOR THE LAPLACIAN EQUATIONS[J].Acta mathematica scientia,Series B, 2007, 27(2): 329-337.

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THE EIGENVALUE PROBLEM FOR THE LAPLACIAN EQUATIONS

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