We study the computational complexity of solving mean payoff games. This class of games can be seen as an extension of parity games, and they have similar complexity status: in both cases solving them is in $\textbf{NP} \cap \textbf{coNP}$ and not known to be in $\textbf{P}$. In a breakthrough result Calude, Jain, Khoussainov, Li, and Stephan constructed in 2017 a quasipolynomial time algorithm for solving parity games, which was quickly followed by two other algorithms with the same complexity. Our objective is to investigate how these techniques can be extended to the study of mean payoff games. The starting point is the notion of separating automata, which has been used to present all three quasipolynomial time algorithms for parity game...
We study some existing techniques for solving mean-payoff games (MPGs), improve them, and design a r...
Muller games are played by two players moving a token along a graph; the winner is determined by the...
Abstract. Muller games are played by two players moving a token along a graph; the winner is determi...
We study the computational complexity of solving mean payoff games. This class of games can be seen ...
The thesis deals with aspects of the algorithmic complexity of some infinite games, called graph gam...
International audienceThis paper is a contribution to the study of parity games and the recent const...
We study the complexity of finding the values and optimal strategies of mean payoff games on graphs,...
We study the complexity of finding the values and optimal strategies of mean payoff games, a family ...
In this paper, we study algorithmic problems for quantitative models that are motivated by the appli...
Parity games are discrete infinite games of two players with complete information. There are two mai...
We propose a novel algorithm for the solution of mean-payoff games that merges together two seemingl...
Abstract. In this paper, we study algorithmic problems for quantitative models that are motivated by...
AbstractWe study the complexity of finding the values and optimal strategies of mean payoff games on...
In a mean-payoff parity game, one of the two players aims both to achieve a qualitative parity objec...
International audienceSeveral distinct techniques have been proposed to design quasi-polynomial algo...
We study some existing techniques for solving mean-payoff games (MPGs), improve them, and design a r...
Muller games are played by two players moving a token along a graph; the winner is determined by the...
Abstract. Muller games are played by two players moving a token along a graph; the winner is determi...
We study the computational complexity of solving mean payoff games. This class of games can be seen ...
The thesis deals with aspects of the algorithmic complexity of some infinite games, called graph gam...
International audienceThis paper is a contribution to the study of parity games and the recent const...
We study the complexity of finding the values and optimal strategies of mean payoff games on graphs,...
We study the complexity of finding the values and optimal strategies of mean payoff games, a family ...
In this paper, we study algorithmic problems for quantitative models that are motivated by the appli...
Parity games are discrete infinite games of two players with complete information. There are two mai...
We propose a novel algorithm for the solution of mean-payoff games that merges together two seemingl...
Abstract. In this paper, we study algorithmic problems for quantitative models that are motivated by...
AbstractWe study the complexity of finding the values and optimal strategies of mean payoff games on...
In a mean-payoff parity game, one of the two players aims both to achieve a qualitative parity objec...
International audienceSeveral distinct techniques have been proposed to design quasi-polynomial algo...
We study some existing techniques for solving mean-payoff games (MPGs), improve them, and design a r...
Muller games are played by two players moving a token along a graph; the winner is determined by the...
Abstract. Muller games are played by two players moving a token along a graph; the winner is determi...