AbstractThe aim of this paper is to prove the existence of extension operators for SBV functions from periodically perforated domains. This result will be the fundamental tool to prove the compactness in a noncoercive homogenization problem
The first part of this thesis is concerned with extension operators for Sobolev spaces on periodic d...
We consider an infinite strip perforated along a curve by small holes. In this perforated domain, we...
The periodic unfolding method was introduced in [4] by D. Cioranescu, A. Damlamian and G. Griso for ...
The aim of this paper is to prove the existence of extension operators for SBV functions from period...
The aim of this paper is to prove the existence of extension operators for SBV functions from period...
The main result of this paper is a compactness theorem for families of functions in the space SBV (S...
2The main result of this paper is a compactness theorem for families of functions in the space SBV (...
AbstractWhen applying homogenization techniques to problems on lattice structures, it is necessary t...
We study the Poisson equation in a perforated domain with homogeneous Dirichlet boundary conditions....
We address homogenization problems for variational inequalities issue from unilateral con-straints f...
This preprint is part of a major rewriting and substantial improvement of WIAS Preprint 2742. In thi...
This is Part III of a series on the existence of uniformly bounded extension operators on randomly p...
Given a bounded open set in Rn, n≥2, and a sequence (Kj) of compact sets converging to an (n-1)-dime...
Abstract. In this paper we give a general presentation of the homogenization of Neumann type problem...
The paper is dedicated to the asymptotic behavior of periodically perforated elastic domains (3D, pl...
The first part of this thesis is concerned with extension operators for Sobolev spaces on periodic d...
We consider an infinite strip perforated along a curve by small holes. In this perforated domain, we...
The periodic unfolding method was introduced in [4] by D. Cioranescu, A. Damlamian and G. Griso for ...
The aim of this paper is to prove the existence of extension operators for SBV functions from period...
The aim of this paper is to prove the existence of extension operators for SBV functions from period...
The main result of this paper is a compactness theorem for families of functions in the space SBV (S...
2The main result of this paper is a compactness theorem for families of functions in the space SBV (...
AbstractWhen applying homogenization techniques to problems on lattice structures, it is necessary t...
We study the Poisson equation in a perforated domain with homogeneous Dirichlet boundary conditions....
We address homogenization problems for variational inequalities issue from unilateral con-straints f...
This preprint is part of a major rewriting and substantial improvement of WIAS Preprint 2742. In thi...
This is Part III of a series on the existence of uniformly bounded extension operators on randomly p...
Given a bounded open set in Rn, n≥2, and a sequence (Kj) of compact sets converging to an (n-1)-dime...
Abstract. In this paper we give a general presentation of the homogenization of Neumann type problem...
The paper is dedicated to the asymptotic behavior of periodically perforated elastic domains (3D, pl...
The first part of this thesis is concerned with extension operators for Sobolev spaces on periodic d...
We consider an infinite strip perforated along a curve by small holes. In this perforated domain, we...
The periodic unfolding method was introduced in [4] by D. Cioranescu, A. Damlamian and G. Griso for ...
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