In this PhD thesis we prove some properties of elliptic equations in connection with periodic homogenization. We mainly study the stationary linearized elasticity system. This thesis consists of five papers complemented with a short introduction.The first paper concerns some elliptic equations on a domain with oscillating boundary. The homogenization is carried out using the method of periodic unfolding, which was recently introduced by D. Cioranescu, A. Damlamian, and G. Griso. We show how the epsilon-sequence can be extended to a stationary domain such that strong convergence is obtained. In this way we justify the homogenization.In the second paper we address a model of a perforated structure, a honeycomb structure, which is locally and ...
This thesis is concerned with extensions and applications of the theory of periodic unfolding in the...
This thesis focuses on the construction of finite element numerical homogenization schemes for both ...
In this thesis, we first consider the periodic homogenization of the linearized elasticity equation ...
In this PhD thesis we prove some properties of elliptic equations in connection with periodic homoge...
In this dissertation, we first provide a short introduction to qualitative homogenization of ellipti...
summary:The homogenization problem (i.e. the approximation of the material with periodic structure b...
A new class of p version FEM for elliptic problems with microstructure is developed. Based on argume...
(Communicated by Andrea Braides) Abstract. In quasi-periodic homogenization of elliptic equations or...
The paper is dedicated to the asymptotic behavior of periodically perforated elastic domains (3D, pl...
A new finite element method for elliptic problems with locally periodic microstructure of length eps...
this paper, rather than viewing periodicity and sparseness as obstacles to be overcome, we exploit t...
In this paper we are concerned with the elliptic PDEs with highly oscillating coefficients which mod...
The periodic unfolding method was introduced in [4] by D. Cioranescu, A. Damlamian and G. Griso for ...
This is the first book on the subject of the periodic unfolding method (originally called "éclatemen...
This article is divided into two chapters. The classical problem of homogenization of elliptic opera...
This thesis is concerned with extensions and applications of the theory of periodic unfolding in the...
This thesis focuses on the construction of finite element numerical homogenization schemes for both ...
In this thesis, we first consider the periodic homogenization of the linearized elasticity equation ...
In this PhD thesis we prove some properties of elliptic equations in connection with periodic homoge...
In this dissertation, we first provide a short introduction to qualitative homogenization of ellipti...
summary:The homogenization problem (i.e. the approximation of the material with periodic structure b...
A new class of p version FEM for elliptic problems with microstructure is developed. Based on argume...
(Communicated by Andrea Braides) Abstract. In quasi-periodic homogenization of elliptic equations or...
The paper is dedicated to the asymptotic behavior of periodically perforated elastic domains (3D, pl...
A new finite element method for elliptic problems with locally periodic microstructure of length eps...
this paper, rather than viewing periodicity and sparseness as obstacles to be overcome, we exploit t...
In this paper we are concerned with the elliptic PDEs with highly oscillating coefficients which mod...
The periodic unfolding method was introduced in [4] by D. Cioranescu, A. Damlamian and G. Griso for ...
This is the first book on the subject of the periodic unfolding method (originally called "éclatemen...
This article is divided into two chapters. The classical problem of homogenization of elliptic opera...
This thesis is concerned with extensions and applications of the theory of periodic unfolding in the...
This thesis focuses on the construction of finite element numerical homogenization schemes for both ...
In this thesis, we first consider the periodic homogenization of the linearized elasticity equation ...