Add to ORKGIn this article, we extend the study of embedded corrector problems, that we have previously introduced in the context of the homogenization of scalar diffusive equations, to the context of homogenized elastic properties of materials. This extension is not trivial and requires mathematical arguments specific to the elasticity case. Starting from a linear elasticity model with highly-oscillatory coefficients, we introduce several effective approximations of the homogenized tensor. These approximations are based on the solution to an embedded corrector problem, where a finite-size domain made of the linear elastic heterogeneous material is embedded in a linear elastic homogeneous infinite medium, the constant elasticity tensor of which has to...
In this thesis, we first consider the periodic homogenization of the linearized elasticity equation ...
A general theory for the homogenization of heterogeneous linear elastic materials that relies on the...
Through a second-order homogenization procedure, the explicit relation is obtained between the non-l...
International audienceThis article is the first part of a two-fold study, the objective of which is ...
summary:The homogenization problem (i.e. the approximation of the material with periodic structure b...
International audienceWe consider a diffusion equation with highly oscillatory coefficients that adm...
International audienceThis contribution is the numerically oriented companion article of the work [E...
This monograph is based on research undertaken by the authors during the last ten years. The main pa...
In this paper we are concerned with the elliptic PDEs with highly oscil-lating coefficients which mo...
n this work the mechanical boundary condition for the micro problem in a two-scaled homogenization u...
25 pagesInternational audienceThis paper deals with the homogenization of a homogeneous elastic medi...
In this paper we are concerned with the elliptic PDEs with highly oscillating coefficients which mod...
Standard effective models of heterogenous materials becomeinaccurate when effective strains fluctuat...
A higher-order homogenization method for linear elastic structures is proposed. While most existing ...
In this thesis, we first consider the periodic homogenization of the linearized elasticity equation ...
A general theory for the homogenization of heterogeneous linear elastic materials that relies on the...
Through a second-order homogenization procedure, the explicit relation is obtained between the non-l...
International audienceThis article is the first part of a two-fold study, the objective of which is ...
summary:The homogenization problem (i.e. the approximation of the material with periodic structure b...
International audienceWe consider a diffusion equation with highly oscillatory coefficients that adm...
International audienceThis contribution is the numerically oriented companion article of the work [E...
This monograph is based on research undertaken by the authors during the last ten years. The main pa...
In this paper we are concerned with the elliptic PDEs with highly oscil-lating coefficients which mo...
n this work the mechanical boundary condition for the micro problem in a two-scaled homogenization u...
25 pagesInternational audienceThis paper deals with the homogenization of a homogeneous elastic medi...
In this paper we are concerned with the elliptic PDEs with highly oscillating coefficients which mod...
Standard effective models of heterogenous materials becomeinaccurate when effective strains fluctuat...
A higher-order homogenization method for linear elastic structures is proposed. While most existing ...
In this thesis, we first consider the periodic homogenization of the linearized elasticity equation ...
A general theory for the homogenization of heterogeneous linear elastic materials that relies on the...
Through a second-order homogenization procedure, the explicit relation is obtained between the non-l...