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Contributions to Game Theory and Management, 2015, том 8, страницы 347–360
(Mi cgtm278)
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On subgame consistent solution for NTU cooperative stochastic dynamic games
David W.K. Yeungab, Leon A. Petrosyanc a Center of Game Theory, St. Petersburg State University, Russia
b SRS Consortium for Advanced Study in Dynamic Cooperative Games, Shue Yan University, Hong Kong
c Faculty of Applied Mathematics-Control Processes,
St. Petersburg State University, Russia
Аннотация:
In cooperative dynamic games a stringent condition — subgame consistency — is required for a dynamically stable solution. In particular, a cooperative solution is subgame consistent if the optimality principle agreed upon at the outset remains in effect in any subgame starting at a later stage with a state brought about by prior optimal behavior. Hence the players do not have incentives to deviate from the previously adopted optimal behavior. Yeung and Petrosyan (2015) provided subgame consistent solutions in cooperative dynamic games with non-transferable payoffs/utility (NTU) using a variable payoffs weights scheme is analyzed. This paper extends their analysis to a stochastic dynamic framework. A solution mechanism for characterizing subgame consistent solutions is derived. The use of a variable payoff weights scheme allows the derivation of subgame consistent solutions under a wide range of optimality principles.
Ключевые слова:
stochastic dynamic games, subgame consistent cooperative solution, variable payoff weights.
Образец цитирования:
David W.K. Yeung, Leon A. Petrosyan, “On subgame consistent solution for NTU cooperative stochastic dynamic games”, Contributions to Game Theory and Management, 8 (2015), 347–360
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/cgtm278 https://www.mathnet.ru/rus/cgtm/v8/p347
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