We provide analytical approximations for the law of the solutions to a certain class of scalar McKean-Vlasov stochastic differential equations (MKV-SDEs) with random initial datum. " Propagation of chaos " results ([Szn91]) connect this class of SDEs with the macroscopic limiting behavior of a particle, evolving within a mean-field interaction particle system, as the total number of particles tends to infinity. Here we assume the mean-field interaction only acting on the drift of each particle, this giving rise to a MKV-SDE where the drift coefficient depends on the law of the unknown solution. By perturbing the non-linear forward Kolmogorov equation associated to the MKV-SDE, we perform a two-steps approximating procedure that decouples th...
We consider the problem of parameter estimation for a stochastic McKean-Vlasov equation, and the ass...
We apply large-deviation theory to particle systems with a random mean-field interaction in the McKe...
The notion of propagation of chaos for large systems of interacting particles originates in statisti...
We provide analytical approximations for the law of the solutions to a certain class of scalar McKea...
We provide analytical approximations for the law of the solutions to a certain class of scalar McKea...
We develop a new approach to study the long time behaviour of solutions to nonlinear stochastic diff...
International audienceThis article is a continuation of our first work \cite{chaudruraynal:frikha}. ...
We develop a new approach to study the long time behaviour of solutions to nonlinear stochastic diff...
McKean-Vlasov stochastic differential equations (MVSDEs) are ubiquitous in kinetic theory and in co...
McKean-Vlasov stochastic differential equations may arise from a probabilistic interpretation of cer...
We consider a general McKean-Vlasov stochastic differential equation driven by a rotationally invari...
This thesis is devoted to the theoretical and numerical study of two main subjects in the context of...
In this thesis, we consider numerical aspects concerning the simulation and strong approximation of ...
In this thesis we propose a numerical approximation for the equilibrium measure of a McKean Vlasov s...
This Ph.D. thesis deals with the numerical solution of two types of stochastic problems. First, we i...
We consider the problem of parameter estimation for a stochastic McKean-Vlasov equation, and the ass...
We apply large-deviation theory to particle systems with a random mean-field interaction in the McKe...
The notion of propagation of chaos for large systems of interacting particles originates in statisti...
We provide analytical approximations for the law of the solutions to a certain class of scalar McKea...
We provide analytical approximations for the law of the solutions to a certain class of scalar McKea...
We develop a new approach to study the long time behaviour of solutions to nonlinear stochastic diff...
International audienceThis article is a continuation of our first work \cite{chaudruraynal:frikha}. ...
We develop a new approach to study the long time behaviour of solutions to nonlinear stochastic diff...
McKean-Vlasov stochastic differential equations (MVSDEs) are ubiquitous in kinetic theory and in co...
McKean-Vlasov stochastic differential equations may arise from a probabilistic interpretation of cer...
We consider a general McKean-Vlasov stochastic differential equation driven by a rotationally invari...
This thesis is devoted to the theoretical and numerical study of two main subjects in the context of...
In this thesis, we consider numerical aspects concerning the simulation and strong approximation of ...
In this thesis we propose a numerical approximation for the equilibrium measure of a McKean Vlasov s...
This Ph.D. thesis deals with the numerical solution of two types of stochastic problems. First, we i...
We consider the problem of parameter estimation for a stochastic McKean-Vlasov equation, and the ass...
We apply large-deviation theory to particle systems with a random mean-field interaction in the McKe...
The notion of propagation of chaos for large systems of interacting particles originates in statisti...