Singularly perturbed spectral problems in a thin cylinder with fourier conditions on its bases
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https://hdl.handle.net/10037/17720Date
2019Type
Journal articleTidsskriftartikkel
Peer reviewed
Abstract
The paper deals with the bottom of the spectrum of a singularly perturbed second order elliptic operator defined in a thin cylinder and having locally periodic coefficients in the longitudinal direction. We impose a homogeneous Neumann boundary condition on the lateral surface of the cylinder and a generic homogeneous Fourier condition at its bases. We then show that the asymptotic behavior of the principal eigenpair can be characterized in terms of the limit one-dimensional problem for the effective Hamilton-Jacobi equation with the effective boundary conditions. In order to construct boundary layer correctors we study a Steklov type spectral problem in a semi-infinite cylinder (these results are of independent interest). Under a structure assumption on the effective problem leading to localization (in certain sense) of eigenfunctions inside the cylinder we prove a two-term asymptotic formula for the first and higher order eigenvalues.
Citation
Piatnitski A, Rybalko V. (2019) Singularly perturbed spectral problems in a thin cylinder with fourier conditions on its bases. Journal of Mathematical Physics, Analysis, Geometry, 15, (2), 256-277Metadata
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