This paper is a set of lecture notes for a short introductory course on homogenization. It covers the basic tools of periodic homogenization (two-scale asymptotic expansions, the oscillating test function method and two-scale convergence) and briefly describes the main results of the more general theory of G− or H−convergence. Several applications of the method are given: derivation of Darcy’s law for flows in porous media, derivation of the porosity model and long time behavior of a diffusion equation. Numerical agorithms for homogenization are also discussed, including multiscale finite element methods
This thesis is mainly devoted to homogenization theory and it consists of an introduction, five pape...
Porous materials are present in many natural as well as engineered structures. Engineering examples ...
International audienceFollowing an idea of G. Nguetseng, we define a notion of "two-scale" convergen...
Homogenization is a collection of powerful techniques in partial differential equations that are use...
We present an introduction to the asymptotic homogenization technique as a follow up of the four hou...
Abstract. This paper is a set of lecture notes for a short introductory course on homogenization. It...
Homogenization of partial differential equations is relatively a new area and has tremendous applica...
This mini-course addresses graduate students and young researchers in mathematics and engineering sc...
The focus of this thesis is the theory of periodic homogenization of partial differential equations ...
Homogenization has proved its effectiveness as a method of upscaling for linear problems, as they oc...
Abstract. The homogenization theory is devoted to analysis of partial differential equations with ra...
The objective of this book is to navigate beginning graduate students in mathematics and engineering...
Homogenization of flow in porous media is studied. The continuity equation in conjunction with Darcy...
Abstract. This paper contains a study of the long time behavior of a diffusion process in a periodic...
We are interested in the homogenization of a stationary Bingham ow in a porous medium.A rigorous jus...
This thesis is mainly devoted to homogenization theory and it consists of an introduction, five pape...
Porous materials are present in many natural as well as engineered structures. Engineering examples ...
International audienceFollowing an idea of G. Nguetseng, we define a notion of "two-scale" convergen...
Homogenization is a collection of powerful techniques in partial differential equations that are use...
We present an introduction to the asymptotic homogenization technique as a follow up of the four hou...
Abstract. This paper is a set of lecture notes for a short introductory course on homogenization. It...
Homogenization of partial differential equations is relatively a new area and has tremendous applica...
This mini-course addresses graduate students and young researchers in mathematics and engineering sc...
The focus of this thesis is the theory of periodic homogenization of partial differential equations ...
Homogenization has proved its effectiveness as a method of upscaling for linear problems, as they oc...
Abstract. The homogenization theory is devoted to analysis of partial differential equations with ra...
The objective of this book is to navigate beginning graduate students in mathematics and engineering...
Homogenization of flow in porous media is studied. The continuity equation in conjunction with Darcy...
Abstract. This paper contains a study of the long time behavior of a diffusion process in a periodic...
We are interested in the homogenization of a stationary Bingham ow in a porous medium.A rigorous jus...
This thesis is mainly devoted to homogenization theory and it consists of an introduction, five pape...
Porous materials are present in many natural as well as engineered structures. Engineering examples ...
International audienceFollowing an idea of G. Nguetseng, we define a notion of "two-scale" convergen...