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Cooperative Stochastic Games with Mean-Variance Preferences

Author

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  • Elena Parilina

    (Department of Mathematical Game Theory and Statistical Decisions, Saint Petersburg State University, 7/9 Universitetskaya nab., 199034 Saint Petersburg, Russia
    School of Mathematics and Statistics, Qingdao University, Qingdao 266071, China
    Institute of Applied Mathematics of Shandong, Qingdao 266071, China
    These authors contributed equally to this work.)

  • Stepan Akimochkin

    (Australia and New Zealand Banking Group Limited, 242 Pitt Street, Sydney, NSW 2000, Australia
    These authors contributed equally to this work.)

Abstract

In stochastic games, the player’s payoff is a stochastic variable. In most papers, expected payoff is considered as a payoff, which means the risk neutrality of the players. However, there may exist risk-sensitive players who would take into account “risk” measuring their stochastic payoffs. In the paper, we propose a model of stochastic games with mean-variance payoff functions, which is the sum of expectation and standard deviation multiplied by a coefficient characterizing a player’s attention to risk. We construct a cooperative version of a stochastic game with mean-variance preferences by defining characteristic function using a maxmin approach. The imputation in a cooperative stochastic game with mean-variance preferences is supposed to be a random vector. We construct the core of a cooperative stochastic game with mean-variance preferences. The paper extends existing models of discrete-time stochastic games and approaches to find cooperative solutions in these games.

Suggested Citation

  • Elena Parilina & Stepan Akimochkin, 2021. "Cooperative Stochastic Games with Mean-Variance Preferences," Mathematics, MDPI, vol. 9(3), pages 1-15, January.
    • Handle: RePEc:gam:jmathe:v:9:y:2021:i:3:p:230-:d:486417
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    References listed on IDEAS

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