AbstractThis note is devoted to the effect of topography on geophysical flows. We consider two models derived from shallow water theory: the quasigeostrophic equation and the lake equation. Small scale variations of topography appear in these models through a periodic function, of small wavelength ε. The asymptotic limit as ε goes to zero reveals homogenization problems in which the cell and averaged equations are both nonlinear. In the spirit of article [P.-L. Lions, N. Masmoudi, Homogenization of the Euler system in a 2D porous medium, J. Math. Pures Appl. (9) 84 (1) (2005) 1–20], we derive rigorously the limit systems, through the notion of two-scale convergence
The present thesis is devoted to the homogenization of certain elliptic and parabolic partial differ...
This dissertation is a mathematical investigation of the so-called lake and the great lake equations...
We aim at understanding transport in porous materials consisting of regions with both high and low d...
International audienceThis note is devoted to the effect of topography on geophysical flows. We cons...
This note is devoted to the effect of topography on geophysical flows. We consider two models derive...
Abstract This paper explores several asymptotic limit regimes for shallow water flows over multiscal...
We explore the problem of a moving free surface in a water-saturated porous medium that has either a...
We perform the periodic homogenization (i. e. e ¿ 0) of the non-stationary Nernst-Planck-Poisson sys...
AbstractWe study the homogenization of the Euler system in a periodic porous medium (of period ɛ) by...
We perform the periodic homogenization (i. e. e ¿ 0) of the non-stationary Stokes-Nernst-Planck-Pois...
We prove an upper bound for the convergence rate of the homogenization limit ε → 0 for a linear tran...
This paper is a set of lecture notes for a short introductory course on homogenization. It...
We prove an upper bound for the convergence rate of the homogenization limit e ¿ 0 for a linear tran...
The aim of the paper is to introduce an alternative notion of two-scale convergence which gives a mo...
AbstractWe perform the periodic homogenization (i.e. ε→0) of a non-stationary Stokes–Nernst–Planck–P...
The present thesis is devoted to the homogenization of certain elliptic and parabolic partial differ...
This dissertation is a mathematical investigation of the so-called lake and the great lake equations...
We aim at understanding transport in porous materials consisting of regions with both high and low d...
International audienceThis note is devoted to the effect of topography on geophysical flows. We cons...
This note is devoted to the effect of topography on geophysical flows. We consider two models derive...
Abstract This paper explores several asymptotic limit regimes for shallow water flows over multiscal...
We explore the problem of a moving free surface in a water-saturated porous medium that has either a...
We perform the periodic homogenization (i. e. e ¿ 0) of the non-stationary Nernst-Planck-Poisson sys...
AbstractWe study the homogenization of the Euler system in a periodic porous medium (of period ɛ) by...
We perform the periodic homogenization (i. e. e ¿ 0) of the non-stationary Stokes-Nernst-Planck-Pois...
We prove an upper bound for the convergence rate of the homogenization limit ε → 0 for a linear tran...
This paper is a set of lecture notes for a short introductory course on homogenization. It...
We prove an upper bound for the convergence rate of the homogenization limit e ¿ 0 for a linear tran...
The aim of the paper is to introduce an alternative notion of two-scale convergence which gives a mo...
AbstractWe perform the periodic homogenization (i.e. ε→0) of a non-stationary Stokes–Nernst–Planck–P...
The present thesis is devoted to the homogenization of certain elliptic and parabolic partial differ...
This dissertation is a mathematical investigation of the so-called lake and the great lake equations...
We aim at understanding transport in porous materials consisting of regions with both high and low d...