International audienceZero-sum stochastic games with finite state and action spaces, perfect information, and mean payoff criteria arise in particular from the monotone discretization of mean-payoff pursuit-evasion deterministic differential games. In that case no irreducibility assumption on the Markov chains associated to strategies are satisfied (multichain games). The value of such a game can be characterized by a system of nonlinear equations, involving the mean payoff vector and an auxiliary vector (relative value or bias). Cochet-Terrasson and Gaubert proposed in (C. R. Math. Acad. Sci. Paris, 2006) a policy iteration algorithm relying on a notion of nonlinear spectral projection (Akian and Gaubert, Nonlinear Analysis TMA, 2003), whi...
Nonzero-sum stochastic differential games with impulse controls offer a realistic and far-reaching m...
We present a fast numerical algorithm for large scale zero-sum stochastic games with perfect informa...
International audienceMean-payoff zero-sum stochastic games can be studied by means of a nonlinear s...
International audienceZero-sum stochastic games with finite state and action spaces, perfect informa...
Preprint arXiv:1208.0446, 34pagesWe consider zero-sum stochastic games with finite state and action ...
In this thesis, we present some algorithms and numerical results for the solution of large scale zer...
Preprint arXiv:1310.4953Recent results of Ye and Hansen, Miltersen and Zwick show that policy iterat...
Research work conducted during the 22nd edition of CEMRACS, Numerical methods for stochastic m...
Stochastic games generalize Markov decision processes (MDPs) to a multiagent setting by allowing the...
This work presents a novel policy iteration algorithm to tackle nonzero-sum stochastic impulse games...
We consider a subclass of $n$-player stochastic games, in which players have their own internal stat...
The policy iteration method is a classical algorithm for solving optimal control problems. In this p...
Strategy iteration is a technique frequently used for two-player games in order to determine the win...
Nonzero-sum stochastic differential games with impulse controls offer a realistic and far-reaching m...
We present a fast numerical algorithm for large scale zero-sum stochastic games with perfect informa...
International audienceMean-payoff zero-sum stochastic games can be studied by means of a nonlinear s...
International audienceZero-sum stochastic games with finite state and action spaces, perfect informa...
Preprint arXiv:1208.0446, 34pagesWe consider zero-sum stochastic games with finite state and action ...
In this thesis, we present some algorithms and numerical results for the solution of large scale zer...
Preprint arXiv:1310.4953Recent results of Ye and Hansen, Miltersen and Zwick show that policy iterat...
Research work conducted during the 22nd edition of CEMRACS, Numerical methods for stochastic m...
Stochastic games generalize Markov decision processes (MDPs) to a multiagent setting by allowing the...
This work presents a novel policy iteration algorithm to tackle nonzero-sum stochastic impulse games...
We consider a subclass of $n$-player stochastic games, in which players have their own internal stat...
The policy iteration method is a classical algorithm for solving optimal control problems. In this p...
Strategy iteration is a technique frequently used for two-player games in order to determine the win...
Nonzero-sum stochastic differential games with impulse controls offer a realistic and far-reaching m...
We present a fast numerical algorithm for large scale zero-sum stochastic games with perfect informa...
International audienceMean-payoff zero-sum stochastic games can be studied by means of a nonlinear s...