ON THE ASYMPTOTIC BEHAVIOR OF EIGENVALUES OF THE BOUNDARY VALUE PROBLEM WITH A PARAMETER
- Authors: Filinovskiy A.1
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Affiliations:
- Bauman Moscow State Technical University
- Issue: Vol 21, No 6 (2015)
- Pages: 135-140
- Section: Articles
- URL: https://journals.ssau.ru/est/article/view/4480
- DOI: https://doi.org/10.18287/2541-7525-2015-21-6-135-140
- ID: 4480
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Abstract
The paper presents the investigation of an eigenvalue problem for the Laplace operator with Robin boundary condition in a bounded domain with smooth boundary. The case of boundary condition containing a real parameter is con- sidered. It is proved that multiplicity of the eigenvalue to the Robin problem for all values of the parameter greater than some number does not exceed the mul- tiplicity of the corresponding eigenvalue to the Dirichlet problem for the Laplace operator. For simple eigenvalue of the Dirichlet problem the convergence of eigen- function of the Robin problem to the eigenfunction of the Dirichlet problem for unlimited increase of the parameter is proved. The formula for derivative on the parameter for eigenvalues of the Robin problem is established. This formula is used to justify the asymptotic expansions of eigenvalues of the Robin problem for large positive values of the parameter.
About the authors
A.V. Filinovskiy
Bauman Moscow State Technical University
Author for correspondence.
Email: morenov.sv@ssau.ru