In this article, we prove the first quantitative uniform in time propagation of chaos for a class of systems of particles in singular repulsive interaction in dimension one that contains the Dyson Brownian motion. We start by establishing existence and uniqueness for the Riesz gases, before proving propagation of chaos with an original approach to the problem, namely coupling with a Cauchy sequence type argument. We also give a general argument to turn a result of weak propagation of chaos into a strong and uniform in time result using the long time behavior and some bounds on moments, in particular enabling us to get a uniform in time version of the result of C\'epa-L\'epingle
The article deals with the propagation of chaos for a system of interacting particles. Under suitabl...
14 pagesIn this article we wish to show, in a concise manner, a result of uniform in time propagatio...
A system of interacting particles described by stochastic differential equations is considered. As o...
International audienceIn this article, we prove the first quantitative uniform in time propagation o...
This paper is devoted to the study of mean-field limit for systems of indistinguables particles unde...
We are interested in nonlinear diffusions in which the own law intervenes in the drift. This kind of...
The propagation of chaos is a central concept of kinetic theory that serves to relate the equations ...
In this article, we adapt the work of Jabin and Wang to show the first result of uniform in time pro...
International audienceBased on a coupling approach, we prove uniform in time propagation of chaos fo...
This book presents a detailed study of a system of interacting Brownian motions in one dimension. Th...
Lanford's theorem is the best known mathematical justification of Boltzmann's equation starting from...
Dynamical systems of N particles in R-D interacting by a singular pair potential of mean field type ...
We prove a quantitative propagation of chaos and entropic chaos, uniformly in time, for the spatiall...
This paper is concerned with the asymptotic behaviour of a system of particles with moderate interac...
In this work, generalizing the techniques introduced by Jabir-Talay-Tomasevic [3], we prove the well...
The article deals with the propagation of chaos for a system of interacting particles. Under suitabl...
14 pagesIn this article we wish to show, in a concise manner, a result of uniform in time propagatio...
A system of interacting particles described by stochastic differential equations is considered. As o...
International audienceIn this article, we prove the first quantitative uniform in time propagation o...
This paper is devoted to the study of mean-field limit for systems of indistinguables particles unde...
We are interested in nonlinear diffusions in which the own law intervenes in the drift. This kind of...
The propagation of chaos is a central concept of kinetic theory that serves to relate the equations ...
In this article, we adapt the work of Jabin and Wang to show the first result of uniform in time pro...
International audienceBased on a coupling approach, we prove uniform in time propagation of chaos fo...
This book presents a detailed study of a system of interacting Brownian motions in one dimension. Th...
Lanford's theorem is the best known mathematical justification of Boltzmann's equation starting from...
Dynamical systems of N particles in R-D interacting by a singular pair potential of mean field type ...
We prove a quantitative propagation of chaos and entropic chaos, uniformly in time, for the spatiall...
This paper is concerned with the asymptotic behaviour of a system of particles with moderate interac...
In this work, generalizing the techniques introduced by Jabir-Talay-Tomasevic [3], we prove the well...
The article deals with the propagation of chaos for a system of interacting particles. Under suitabl...
14 pagesIn this article we wish to show, in a concise manner, a result of uniform in time propagatio...
A system of interacting particles described by stochastic differential equations is considered. As o...