The elasticity problem in a periodic structure with prescribed interface jumps in displacements and tractions and oscillating Neumann condition on a part of the external boundary is considered. This work is just a generalization of inhomogeneous Dirichlet and Neumann conditions on the oscillating interface. Such interface jumps arise, e.g. in contact problems with known periodic contact interface. Two-scale approach was applied to the problem and the two-scale convergence was proven. This article also provides a detailed auxiliary analysis for Sobolev functions with interface jumps
AbstractIn this paper we study a simplified model of the behavior of a 3-D solid made from two elast...
International audienceThis lecture is devoted to the modeling of imperfect interfaces, i.e. models t...
In this paper we study the homogenization of an elliptic boundary-value problem, with oscillating co...
In this work we consider the elasticity problem for two domains separated by a heterogeneous layer. ...
International audienceWe study the interaction of in-plane elastic waves with imperfect interfaces c...
Inspired by continuum mechanical contact problems with geological fault networks, we consider ellipt...
The paper deals with existence and homogenization for elliptic problems with lower order terms sin...
International audienceIn this work, the concept of high-frequency homoge-nisation is extended to the...
We consider the elasticity problem in a domain with contact on multiple periodic open cracks. The co...
This thesis details recent results on the periodic homogenization of interface motions in the parabo...
We consider a contact problem between a macroscopic solid with a smooth boundary and a technical tex...
Artículo de publicación ISIIn this paper we study a simplified model of the behavior of a 3-D solid ...
International audienceIn this paper we study the asymptotic behavior of the eigen-value problem solu...
We study the homogenization of a scalar problem posed in a composite medium made up of two materials...
The microstructure of defects in solids, e.g. interfaces, is heterogeneous and, consequently, so are...
AbstractIn this paper we study a simplified model of the behavior of a 3-D solid made from two elast...
International audienceThis lecture is devoted to the modeling of imperfect interfaces, i.e. models t...
In this paper we study the homogenization of an elliptic boundary-value problem, with oscillating co...
In this work we consider the elasticity problem for two domains separated by a heterogeneous layer. ...
International audienceWe study the interaction of in-plane elastic waves with imperfect interfaces c...
Inspired by continuum mechanical contact problems with geological fault networks, we consider ellipt...
The paper deals with existence and homogenization for elliptic problems with lower order terms sin...
International audienceIn this work, the concept of high-frequency homoge-nisation is extended to the...
We consider the elasticity problem in a domain with contact on multiple periodic open cracks. The co...
This thesis details recent results on the periodic homogenization of interface motions in the parabo...
We consider a contact problem between a macroscopic solid with a smooth boundary and a technical tex...
Artículo de publicación ISIIn this paper we study a simplified model of the behavior of a 3-D solid ...
International audienceIn this paper we study the asymptotic behavior of the eigen-value problem solu...
We study the homogenization of a scalar problem posed in a composite medium made up of two materials...
The microstructure of defects in solids, e.g. interfaces, is heterogeneous and, consequently, so are...
AbstractIn this paper we study a simplified model of the behavior of a 3-D solid made from two elast...
International audienceThis lecture is devoted to the modeling of imperfect interfaces, i.e. models t...
In this paper we study the homogenization of an elliptic boundary-value problem, with oscillating co...