Les articles ci-dessous sont décrits dans la partie Recherche.
Long-time behavior of the Stokes-transport system in a channel.Avec Julien Guillod et Antoine Leblond. Disponible sur HAL.
A nonlinear forward-backward problem.Avec Frédéric Marbach et Jean Rax. Disponible sur arXiv.
Local and global well-posedness of one-dimensional free-congested equations.Avec Charlotte Perrin. À paraître dans les Annales Henri Lebesgue. Disponible sur HAL.
Traveling waves for the porous medium equation in the incompressible limit: asymptotic behavior and nonlinear stability.Avec Gabriela Lopez-Ruiz, Charlotte Perrin. À paraître dans Indiana University Mathematics Journal. Disponible sur HAL.
Existence and stability of partially congested propagation fronts in a one-dimensional Navier-Stokes model.
Near-critical reflection of internal waves
Separation for the stationary Prandtl equation.
An existence result for the steady rotating Prandtl equation.
High frequency analysis of the unsteady Interactive Boundary Layer model.
Existence and stability of planar shocks of viscous scalar conservation laws with space-periodic flux.
Nonlinear boundary layers for rotating fluids.
Mathematical Study of Degenerate Boundary Layers: A Large Scale Ocean Circulation Problem
Well-posedness of the Stokes-Coriolis system in the half-space over a rough surface.
Computation of the effective slip of rough hydrophobic surfaces via homogenization.
On shape optimization problems involving the fractional laplacian.
Effective boundary condition at a rough surface starting from a slip condition.
Stability of periodic stationary solutions of scalar conservation laws with space-periodic flux.
Mathematical study of the beta-plane model for rotating fluids in a thin layer.
Long time behavior of viscous scalar conservation laws with space periodic flux.
Asymptotic behaviour of a rapidly rotating fluid with random stationary surface stress.
Mathematical study of resonant wind-driven oceanic motions.
Resonant wind-driven oceanic motions.
Homogenization of nonlinear scalar conservation laws.
Homogenization of linear transport equations in a stationary ergodic setting.
Existence of solutions of the hyperbolic Keller-Segel model.
Kinetic formulation for heterogenous parabolic conservation laws.
Initial layer for the homogenization of a scalar conservation law with vanishing viscosity.
Homogenization of a scalar conservation law with vanishing viscosity.
Kinetic formulation for heterogeneous scalar conservation laws.
Phénomène de séparation pour l'équation de Prandtl stationnaire..
Wall laws for viscous fluids near rough surfaces..
Etude mathématique de fluides en rotation rapide avec forçage en surface..