Add to ORKGWe study multiplayer Blackwell games, which are repeated games where the payoff of each player is a bounded and Borel-measurable function of the infinite stream of actions played by the players during the game. These games are an extension of the two-player perfect-information games studied by David Gale and Frank Stewart (1953). Recently, various new ideas have been discovered to study Blackwell games. In this paper, we give an overview of these ideas by proving, in four different ways, that Blackwell games with a finite number of players, finite action sets, and tail-measurable payoffs admit an $\varepsilon$-equilibrium, for all $\varepsilon>0$
We characterize the set of communication equilibrium payoffs of any undiscounted repeated matrix-gam...
We study the extent to which equilibrium payoffs of discounted repeated games can be obtained by 1 –...
International audienceWe consider repeated games with compact actions sets and pure strategies in wh...
We consider repeated games with tail-measurable payoffs, i.e., when the payoffs depend only on what ...
We consider multiplayer stochastic games with finitely many players and actions, and countably many ...
We provide a characterization of subgame-perfect equilibrium plays in a class of perfect information...
Much of the recent interest in the economic applications of game theory has been drawn to time-incon...
We prove that every multi-player Borel game with bounded and lower-semi-continuous payoffs admits a ...
We consider repeated games with compact actions sets and pure strategies in which players commonly o...
A real-valued function j that is defined over all Borel sets of a topological space is regular if fo...
This paper studies finitely repeated games with semi-standard monitoring played in pure strategies. ...
ED EPSInternational audienceThis paper studies finitely repeated games with semi-standard monitoring...
We study the existence of different notions of values in two-person zero-sum repeatedgames where the...
We study the extent to which equilibrium payoffs of discounted repeated games can be obtained by 1-m...
We characterize the set of communication equilibrium payoffs of any undiscounted repeated matrix-gam...
We study the extent to which equilibrium payoffs of discounted repeated games can be obtained by 1 –...
International audienceWe consider repeated games with compact actions sets and pure strategies in wh...
We consider repeated games with tail-measurable payoffs, i.e., when the payoffs depend only on what ...
We consider multiplayer stochastic games with finitely many players and actions, and countably many ...
We provide a characterization of subgame-perfect equilibrium plays in a class of perfect information...
Much of the recent interest in the economic applications of game theory has been drawn to time-incon...
We prove that every multi-player Borel game with bounded and lower-semi-continuous payoffs admits a ...
We consider repeated games with compact actions sets and pure strategies in which players commonly o...
A real-valued function j that is defined over all Borel sets of a topological space is regular if fo...
This paper studies finitely repeated games with semi-standard monitoring played in pure strategies. ...
ED EPSInternational audienceThis paper studies finitely repeated games with semi-standard monitoring...
We study the existence of different notions of values in two-person zero-sum repeatedgames where the...
We study the extent to which equilibrium payoffs of discounted repeated games can be obtained by 1-m...
We characterize the set of communication equilibrium payoffs of any undiscounted repeated matrix-gam...
We study the extent to which equilibrium payoffs of discounted repeated games can be obtained by 1 –...
International audienceWe consider repeated games with compact actions sets and pure strategies in wh...