Nash equilibrium for upward-closed objectives

K. Chatterjee, in:, Springer, 2006, pp. 271–286.

Download
No fulltext has been uploaded. References only!

Conference Paper | Published
Series Title
LNCS
Abstract
We study infinite stochastic games played by n-players on a finite graph with goals specified by sets of infinite traces. The games are concurrent (each player simultaneously and independently chooses an action at each round), stochastic (the next state is determined by a probability distribution depending on the current state and the chosen actions), infinite (the game continues for an infinite number of rounds), nonzero-sum (the players’ goals are not necessarily conflicting), and undiscounted. We show that if each player has an upward-closed objective, then there exists an ε-Nash equilibrium in memoryless strategies, for every ε>0; and exact Nash equilibria need not exist. Upward-closure of an objective means that if a set Z of infinitely repeating states is winning, then all supersets of Z of infinitely repeating states are also winning. Memoryless strategies are strategies that are independent of history of plays and depend only on the current state. We also study the complexity of finding values (payoff profile) of an ε-Nash equilibrium. We show that the values of an ε-Nash equilibrium in nonzero-sum concurrent games with upward-closed objectives for all players can be computed by computing ε-Nash equilibrium values of nonzero-sum concurrent games with reachability objectives for all players and a polynomial procedure. As a consequence we establish that values of an ε-Nash equilibrium can be computed in TFNP (total functional NP), and hence in EXPTIME.
Publishing Year
Date Published
2006-09-28
Acknowledgement
This research was supported in part by the NSF grants CCR-0225610 and CCR- 0234690, and by the SNSF under the Indo-Swiss Joint Research Programme.
Volume
4207
Page
271 - 286
Conference
CSL: Computer Science Logic
IST-REx-ID

Cite this

Chatterjee K. Nash equilibrium for upward-closed objectives. In: Vol 4207. Springer; 2006:271-286. doi:10.1007/11874683_18
Chatterjee, K. (2006). Nash equilibrium for upward-closed objectives (Vol. 4207, pp. 271–286). Presented at the CSL: Computer Science Logic, Springer. https://doi.org/10.1007/11874683_18
Chatterjee, Krishnendu. “Nash Equilibrium for Upward-Closed Objectives,” 4207:271–86. Springer, 2006. https://doi.org/10.1007/11874683_18.
K. Chatterjee, “Nash equilibrium for upward-closed objectives,” presented at the CSL: Computer Science Logic, 2006, vol. 4207, pp. 271–286.
Chatterjee K. 2006. Nash equilibrium for upward-closed objectives. CSL: Computer Science Logic, LNCS , vol. 4207. 271–286.
Chatterjee, Krishnendu. Nash Equilibrium for Upward-Closed Objectives. Vol. 4207, Springer, 2006, pp. 271–86, doi:10.1007/11874683_18.

Export

Marked Publications

Open Data IST Research Explorer

Search this title in

Google Scholar