Add to ORKGWe consider a reaction-diffusion equation with a half-Laplacian. In the case where the solution is independent on time, the model reduces to the Peierls-Nabarro model describing dislocations as transition layers in a phase field setting. We introduce a suitable rescaling of the evolution equation, using a small parameter $\varepsilon$. As $\varepsilon$ goes to zero, we show that the limit dynamics is characterized by a system of ODEs describing the motion of particles with two-body interactions. The interaction forces are in $1/x$ and correspond to the well-known interaction between dislocations
We study the Cauchy–Dirichlet problem for the p(x)-Laplacian equation with a regular finite nonlinea...
In the context of some bidimensionnal Navier-Stokes model, we exhibit a family of exact oscillating ...
In this paper, we study the one-dimensional transport process in the case of disbalance. In the hydr...
We consider an evolution equation arising in the Peierls--Nabarro model for crystal dislocation. we ...
In this work, we study the effective geometric motions of an anisotropic Ginzburg--Landau equation w...
This paper deals with the question of blow-up of solutions to nonlocal reaction-diffusion systems un...
We provide a rigorous mathematical framework to establish the hydrodynamic limit of the Vlasov model...
AbstractThis paper is concerned with a phase-field model with temperature dependent constraint for t...
We describe a framework to reduce the computational effort to evaluate large deviation functions of ...
In this paper, the global existence of smooth solution and the long-time asymptotic stability of the...
AbstractIn this paper, we study the vanishing viscosity limit for a coupled Navier–Stokes/Allen–Cahn...
AbstractThe diffusion behavior driven by bounded noise under the influence of a coupled harmonic pot...
AbstractThe electro-diffusion model, which arises in electrohydrodynamics, is a coupling between the...
International audienceWe present a new mathematical model of the electric activity of the heart. In ...
International audienceThe dynamics induced by the existence of different timescales in a system is e...
We study the Cauchy–Dirichlet problem for the p(x)-Laplacian equation with a regular finite nonlinea...
In the context of some bidimensionnal Navier-Stokes model, we exhibit a family of exact oscillating ...
In this paper, we study the one-dimensional transport process in the case of disbalance. In the hydr...
We consider an evolution equation arising in the Peierls--Nabarro model for crystal dislocation. we ...
In this work, we study the effective geometric motions of an anisotropic Ginzburg--Landau equation w...
This paper deals with the question of blow-up of solutions to nonlocal reaction-diffusion systems un...
We provide a rigorous mathematical framework to establish the hydrodynamic limit of the Vlasov model...
AbstractThis paper is concerned with a phase-field model with temperature dependent constraint for t...
We describe a framework to reduce the computational effort to evaluate large deviation functions of ...
In this paper, the global existence of smooth solution and the long-time asymptotic stability of the...
AbstractIn this paper, we study the vanishing viscosity limit for a coupled Navier–Stokes/Allen–Cahn...
AbstractThe diffusion behavior driven by bounded noise under the influence of a coupled harmonic pot...
AbstractThe electro-diffusion model, which arises in electrohydrodynamics, is a coupling between the...
International audienceWe present a new mathematical model of the electric activity of the heart. In ...
International audienceThe dynamics induced by the existence of different timescales in a system is e...
We study the Cauchy–Dirichlet problem for the p(x)-Laplacian equation with a regular finite nonlinea...
In the context of some bidimensionnal Navier-Stokes model, we exhibit a family of exact oscillating ...
In this paper, we study the one-dimensional transport process in the case of disbalance. In the hydr...