This project investigates numerical methods for solving fully coupled forward-backward stochastic differential equations (FBSDEs) of McKean-Vlasov type. Having numerical solvers for such mean field FBSDEs is of interest because of the potential application of these equations to optimization problems over a large population, say for instance mean field games (MFG) and optimal mean field control problems. Theory for this kind of problems has met with great success since the early works on mean field games by Lasry and Lions, see [29], and by Huang, Caines, and Malhamé, see [26]. Generally speaking, the purpose is to understand the continuum limit of optimizers or of equilibria (say in Nash sense) as the number of underlying players tends to i...
We study mean field games and corresponding N-player games in continuous time over a finite time hor...
Mean fields games describe the asymptotic behavior of differential games in which the number of play...
This thesis investigates cases when solutions to a mean field game (MFG) are non-unique. The symmetr...
This project investigates numerical methods for solving fully coupled forward-backward stochastic di...
This project investigates numerical methods for solving fully coupled forward-backward stochastic di...
Motivated by a cap-and-trade model for the green house gas emissions regulation, we discuss and comp...
The purpose of this note is to provide an existence result for the solution of fully coupled Forward...
The purpose of this paper is to provide a detailed probabilistic analysis of the optimal control of ...
Cette thèse traite de la solution numérique de deux types de problèmes stochastiques. Premièrement, ...
We discuss and compare two methods of investigations for the asymptotic regime of stochastic differe...
Mean field type models describing the limiting behavior of stochastic differential game problems, as...
Cette thèse traite de la solution numérique de deux types de problèmes stochastiques. Premièrement, ...
Mean field type models describing the limiting behavior, as the number of players tends to +∞, of st...
We propose a new algorithm to approach weakly the solution of a McKean-Vlasov SDE. Based on the cuba...
ABSTRACT. The purpose of this note is to provide an existence result for the solution of fully coupl...
We study mean field games and corresponding N-player games in continuous time over a finite time hor...
Mean fields games describe the asymptotic behavior of differential games in which the number of play...
This thesis investigates cases when solutions to a mean field game (MFG) are non-unique. The symmetr...
This project investigates numerical methods for solving fully coupled forward-backward stochastic di...
This project investigates numerical methods for solving fully coupled forward-backward stochastic di...
Motivated by a cap-and-trade model for the green house gas emissions regulation, we discuss and comp...
The purpose of this note is to provide an existence result for the solution of fully coupled Forward...
The purpose of this paper is to provide a detailed probabilistic analysis of the optimal control of ...
Cette thèse traite de la solution numérique de deux types de problèmes stochastiques. Premièrement, ...
We discuss and compare two methods of investigations for the asymptotic regime of stochastic differe...
Mean field type models describing the limiting behavior of stochastic differential game problems, as...
Cette thèse traite de la solution numérique de deux types de problèmes stochastiques. Premièrement, ...
Mean field type models describing the limiting behavior, as the number of players tends to +∞, of st...
We propose a new algorithm to approach weakly the solution of a McKean-Vlasov SDE. Based on the cuba...
ABSTRACT. The purpose of this note is to provide an existence result for the solution of fully coupl...
We study mean field games and corresponding N-player games in continuous time over a finite time hor...
Mean fields games describe the asymptotic behavior of differential games in which the number of play...
This thesis investigates cases when solutions to a mean field game (MFG) are non-unique. The symmetr...