Add to ORKGAbstract. We consider the homogenization of a singularly perturbed self-adjoint fourth order elliptic equation with locally periodic coefficients, stated in a bounded domain. We impose Dirichlet boundary conditions on the boundary of the domain. The presence of large parameters in the lower order terms and the dependence of the coefficients on the slow variable give rise to the effect of localization of the eigenfunctions. We show that the jth eigenfunction can be approximated by a rescaled function that is constructed in terms of the jth eigenfunction of fourth or second order order effective operators with constant coefficients, depending on the large parameters. 1. Introduction an
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International audienceWe study the asymptotic behavior of the first eigenvalue and eigenfunctionof a...
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The operator A(epsilon) = D(1)g(1)(x(1)/epsilon,x(2))D(1) + D(2)g(2)(x(1)/epsilon,x(2))D(2) is consi...
We consider a boundary value problem for a homogeneous elliptic equation with an inhomogeneous Stekl...
We consider the homogenization of both the parabolic and eigenvalue problems for a singularly pertur...
Artículo de publicación ISIThis paper considers the periodic spectral problem associated with the La...
The paper deals with a Dirichlet spectral problem for an elliptic operator with ε-period...