In one space dimension we address the homogenization of the spectral problem for a singularly perturbed diffusion equation in a periodic medium. Denoting by (Epsilon) the period, the diffusion coefficient is scaled as (Epsilon). The domain is made of two purely periodic media separated by an interface. Depending on the connection between the two cell spectral equations, three different situations arise when (Epsilon) goes to zero. First, there is a global homogenized problem as in the case without an interface. Second, the limit is made of two homogenized problems with a Dirichlet boundary condition on the interface. Third, there is an exponential localization near the interface of the first eigenfunction
We study the asymptotic behavior of the first eigenvalue and eigen- function of a one-dimensional pe...
International audienceThe asymptotic behavior of a one-dimensional spectral problem with periodic co...
International audienceWe study the asymptotic behavior of the first eigenvalue and eigenfunctionof a...
In one space dimension we address the homogenization of the spectral problem for a singularly pertur...
Abstract. In one space dimension we address the homogenization of the spectral problem for a singula...
International audienceWe consider the homogenization of a spectral problem for a diffusion equation ...
We consider the homogenization of the spectral problem for a singularly perturbed diffusion equation...
We consider the homogenization of both the parabolic and eigenvalue problems for a singularly pertur...
In this paper, we study the homogenization and localization of a spectral transport equation posed ...
Abstract. In this paper, we study the homogenization and localization of a spectral transport equa-t...
We consider a diffusion process with coefficients that are periodic outside of an “interface region”...
We consider a diffusion process with coefficients that are periodic outside of an ‘interface region’...
This paper is aimed at homogenization of an elliptic spectral problem stated in a perforated domain,...
We study the asymptotic behavior of the first eigenvalue and eigen- function of a one-dimensional pe...
International audienceThe asymptotic behavior of a one-dimensional spectral problem with periodic co...
International audienceWe study the asymptotic behavior of the first eigenvalue and eigenfunctionof a...
In one space dimension we address the homogenization of the spectral problem for a singularly pertur...
Abstract. In one space dimension we address the homogenization of the spectral problem for a singula...
International audienceWe consider the homogenization of a spectral problem for a diffusion equation ...
We consider the homogenization of the spectral problem for a singularly perturbed diffusion equation...
We consider the homogenization of both the parabolic and eigenvalue problems for a singularly pertur...
In this paper, we study the homogenization and localization of a spectral transport equation posed ...
Abstract. In this paper, we study the homogenization and localization of a spectral transport equa-t...
We consider a diffusion process with coefficients that are periodic outside of an “interface region”...
We consider a diffusion process with coefficients that are periodic outside of an ‘interface region’...
This paper is aimed at homogenization of an elliptic spectral problem stated in a perforated domain,...
We study the asymptotic behavior of the first eigenvalue and eigen- function of a one-dimensional pe...
International audienceThe asymptotic behavior of a one-dimensional spectral problem with periodic co...
International audienceWe study the asymptotic behavior of the first eigenvalue and eigenfunctionof a...