Starting from a system of N particles at a microscopic scale, we describe different scaling limits which lead to kinetic equations in a macroscopic regime: the low-density limit, the weak-coupling limit, the grazing collision limit and the mean-field limit. A particular relevance is given to the rigorous derivation of the Boltzmann equation (starting from a system of N particles interacting via a short range potential) and to a consistency result concerning the Landau equation. A Kac's model for the Landau equation is presented as well. The last part of the work is dedicated to the Vlasov-Poisson system, in particular we discuss the Cauchy problem related to this equation in presence of a point charge
I propose to study two different problems related to recent developments on kinetic theories. The fi...
We are interested in a kinetic equation intended to describe the interactions of particles with thei...
This article introduces a novel approach to the mean-field limit of stochastic systems of interactin...
Starting from a system of N particles at a microscopic scale, we describe different scaling limits w...
89 pagesIn this paper we review the formal derivation of different classes of kinetic equations for ...
We consider a system of N particles interacting via a short-range smooth potential, in a intermediat...
We shall give an introduction to the validity problem for kinetic equations and we shall review some...
The purpose of kinetic equations is the description of dilute particle gases at an intermediate scal...
The purpose of kinetic equations is the description of dilute particle gases at an intermediate scal...
In this thesis we consider the mean field limit of $N$-particle system induced both from social scie...
There are plenty of macroscopic models of fluids, hence the following question arises: "What are the...
We examine a family of microscopic models of plasmas, with a parameter [\alpha] comparing the typica...
In this course, we introduce kinetic equations, and notably the Vlasov-Poisson and Vlasov-Maxwell sy...
This paper is devoted to the study of propagation of chaos and mean-field limit for systems of indis...
16 pages, to appear in Séminaire Laurent Schwartz (2012-2013)We consider systems of $N$ particles in...
I propose to study two different problems related to recent developments on kinetic theories. The fi...
We are interested in a kinetic equation intended to describe the interactions of particles with thei...
This article introduces a novel approach to the mean-field limit of stochastic systems of interactin...
Starting from a system of N particles at a microscopic scale, we describe different scaling limits w...
89 pagesIn this paper we review the formal derivation of different classes of kinetic equations for ...
We consider a system of N particles interacting via a short-range smooth potential, in a intermediat...
We shall give an introduction to the validity problem for kinetic equations and we shall review some...
The purpose of kinetic equations is the description of dilute particle gases at an intermediate scal...
The purpose of kinetic equations is the description of dilute particle gases at an intermediate scal...
In this thesis we consider the mean field limit of $N$-particle system induced both from social scie...
There are plenty of macroscopic models of fluids, hence the following question arises: "What are the...
We examine a family of microscopic models of plasmas, with a parameter [\alpha] comparing the typica...
In this course, we introduce kinetic equations, and notably the Vlasov-Poisson and Vlasov-Maxwell sy...
This paper is devoted to the study of propagation of chaos and mean-field limit for systems of indis...
16 pages, to appear in Séminaire Laurent Schwartz (2012-2013)We consider systems of $N$ particles in...
I propose to study two different problems related to recent developments on kinetic theories. The fi...
We are interested in a kinetic equation intended to describe the interactions of particles with thei...
This article introduces a novel approach to the mean-field limit of stochastic systems of interactin...