This paper concerns the periodic homogenization of the stationary heat equation in a domain with two connected components, separated by an oscillating interface defined on prefractal Koch type curves. The problem depends both on the parameter ε that defines the periodic structure of the interface and on n, which is the index of the prefractal iteration. First, we study the limit as ε vanishes, showing that the homogenized problem is strictly dependent on the amplitude of the oscillations and the parameter appearing in the transmission condition. Finally, we perform the asymptotic behaviour as n goes to infinity, giving rise to a limit problem defined on a domain with fractal interface
We study the question of periodic homogenization of a variably scaled reaction-diffusion problem wit...
International audienceWe consider the homogenization of a spectral problem for a diffusion equation ...
Homogenization results for an insulating fractal surface S of Koch type are proved
International audienceIn this paper, we consider a stationary heat problem on a two-component domain...
In this paper we describe the asymptotic behavior of a problem depending on a small parameter ε > 0 ...
Heat conduction is investigated in periodic (single- or multi-phase) microstructures having disconne...
Inspired by continuum mechanical contact problems with geological fault networks, we consider ellipt...
The aim of this work is to obtain convergence results for the solutions of transmission problems acr...
We consider a diffusion process with coefficients that are periodic outside of an ‘interface region’...
We consider a diffusion process with coefficients that are periodic outside of an “interface region”...
Conduction in a semi-infinite wall with a grooved line of contact between the wall material and conv...
The aim of this paper is to describe the asymptotic behavior, as ε->0, of an elliptic problem with ...
The aim of this paper is to investigate second order transmission problems across quasi-filling dyna...
International audienceWe consider a transmission problem in which the interior domain has infinitely...
The paper deals with existence and homogenization for elliptic problems with lower order terms sin...
We study the question of periodic homogenization of a variably scaled reaction-diffusion problem wit...
International audienceWe consider the homogenization of a spectral problem for a diffusion equation ...
Homogenization results for an insulating fractal surface S of Koch type are proved
International audienceIn this paper, we consider a stationary heat problem on a two-component domain...
In this paper we describe the asymptotic behavior of a problem depending on a small parameter ε > 0 ...
Heat conduction is investigated in periodic (single- or multi-phase) microstructures having disconne...
Inspired by continuum mechanical contact problems with geological fault networks, we consider ellipt...
The aim of this work is to obtain convergence results for the solutions of transmission problems acr...
We consider a diffusion process with coefficients that are periodic outside of an ‘interface region’...
We consider a diffusion process with coefficients that are periodic outside of an “interface region”...
Conduction in a semi-infinite wall with a grooved line of contact between the wall material and conv...
The aim of this paper is to describe the asymptotic behavior, as ε->0, of an elliptic problem with ...
The aim of this paper is to investigate second order transmission problems across quasi-filling dyna...
International audienceWe consider a transmission problem in which the interior domain has infinitely...
The paper deals with existence and homogenization for elliptic problems with lower order terms sin...
We study the question of periodic homogenization of a variably scaled reaction-diffusion problem wit...
International audienceWe consider the homogenization of a spectral problem for a diffusion equation ...
Homogenization results for an insulating fractal surface S of Koch type are proved