Add to ORKGBy means of the two-scale convergence method, we investigate the asymptotic behavior of eigenvalues and eigenfunctions of Stekloff eigenvalue problems in perforated domains. We prove a concise and precise homogenization result including convergence of gradients of eigenfunctions which improves the understanding of the asymptotic behavior of eigenfunctions. It is also justified that the natural local problem is not an eigenvalue problem
This paper is aimed at homogenization of an elliptic spectral problem stated in a perforated domain...
summary:Stochastic homogenization (with multiple fine scales) is studied for a class of nonlinear mo...
International audienceWe study the asymptotic behavior of the first eigenvalue and eigenfunctionof a...
We obtain estimates for convergence rates of the eigenelements (λ", u") for the Laplace operator in ...
In this work we study the homogenization for eigenvalues of the fractional p-Laplace operator in a b...
By means of the two-scale convergence method, we investigate the asymptotic behavior ofeigenvalues a...
We construct two-term asymptotics ?? k = ?m?2(M + ??k + O(?3/2)) of eigenvalues of a mixed boundary-...
AbstractWe consider the first eigenvalue of the Dirichlet–Laplacian in three cases: C1,1-domains, Li...
We determine the second term of the asymptotic expansions for the first m eigenvalues and eigenfunct...
summary:Reiterated homogenization is studied for divergence structure parabolic problems of the form...
AbstractIn this paper, we study reiterated homogenization for equations of the form −div(aɛ(x,Duɛ))=...
In this paper we investigate homogenization results for the principal eigenvalue problem associated ...
Abstract We study the asymptotic behavior of solutions and eigenelements to a boundary value problem...
Boundary value problems for second- and fourth- order ordinary differential operators with a spectra...
In the book [Yu. Safarov and D. Vassiliev, The asymptotic distribution of eigenvalues of partial dif...
This paper is aimed at homogenization of an elliptic spectral problem stated in a perforated domain...
summary:Stochastic homogenization (with multiple fine scales) is studied for a class of nonlinear mo...
International audienceWe study the asymptotic behavior of the first eigenvalue and eigenfunctionof a...
We obtain estimates for convergence rates of the eigenelements (λ", u") for the Laplace operator in ...
In this work we study the homogenization for eigenvalues of the fractional p-Laplace operator in a b...
By means of the two-scale convergence method, we investigate the asymptotic behavior ofeigenvalues a...
We construct two-term asymptotics ?? k = ?m?2(M + ??k + O(?3/2)) of eigenvalues of a mixed boundary-...
AbstractWe consider the first eigenvalue of the Dirichlet–Laplacian in three cases: C1,1-domains, Li...
We determine the second term of the asymptotic expansions for the first m eigenvalues and eigenfunct...
summary:Reiterated homogenization is studied for divergence structure parabolic problems of the form...
AbstractIn this paper, we study reiterated homogenization for equations of the form −div(aɛ(x,Duɛ))=...
In this paper we investigate homogenization results for the principal eigenvalue problem associated ...
Abstract We study the asymptotic behavior of solutions and eigenelements to a boundary value problem...
Boundary value problems for second- and fourth- order ordinary differential operators with a spectra...
In the book [Yu. Safarov and D. Vassiliev, The asymptotic distribution of eigenvalues of partial dif...
This paper is aimed at homogenization of an elliptic spectral problem stated in a perforated domain...
summary:Stochastic homogenization (with multiple fine scales) is studied for a class of nonlinear mo...
International audienceWe study the asymptotic behavior of the first eigenvalue and eigenfunctionof a...