Dynamic Potential Games: The Discrete-Time Stochastic Case

被引:16
|
作者
Gonzalez-Sanchez, David [1 ]
Hernandez-Lerma, Onesimo [2 ]
机构
[1] SEPI ESE IPN, Mexico City 11340, DF, Mexico
[2] IPN, CINVESTAV, Dept Math, Mexico City 07000, DF, Mexico
来源
DYNAMIC GAMES AND APPLICATIONS | 2014年 / 4卷 / 03期
关键词
Dynamic games; Euler equation; Potential games; Nash equilibrium; Pareto solution; CORRELATED EQUILIBRIUM;
D O I
10.1007/s13235-014-0105-3
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
This paper concerns a class of nonstationary discrete-time stochastic noncooperative games. Our goals are threefold. First, we give conditions to find Nash equilibria by means of the Euler equation approach. Second, we identify subclasses of dynamic potential games. Finally, within one of this subclasses, we identify a further subclass for which Nash equilibria are also Pareto (or cooperative) solutions.
引用
收藏
页码:309 / 328
页数:20
相关论文
共 50 条
  • [1] Dynamic Potential Games: The Discrete-Time Stochastic Case
    David González-Sánchez
    Onésimo Hernández-Lerma
    [J]. Dynamic Games and Applications, 2014, 4 : 309 - 328
  • [2] Linear-quadratic discrete-time dynamic potential games
    Mazalov, V. V.
    Rettieva, A. N.
    Avrachenkov, K. E.
    [J]. AUTOMATION AND REMOTE CONTROL, 2017, 78 (08) : 1537 - 1544
  • [3] Linear-quadratic discrete-time dynamic potential games
    V. V. Mazalov
    A. N. Rettieva
    K. E. Avrachenkov
    [J]. Automation and Remote Control, 2017, 78 : 1537 - 1544
  • [4] Discrete-Time Stochastic Stackelberg Dynamic Games with a Large Number of Followers
    Moon, Jun
    Basar, Tamer
    [J]. 2016 IEEE 55TH CONFERENCE ON DECISION AND CONTROL (CDC), 2016, : 3578 - 3583
  • [5] DETERMINISTIC MARKOV NASH EQUILIBRIA FOR POTENTIAL DISCRETE-TIME STOCHASTIC GAMES
    Fonseca-Morales, Alejandra
    [J]. KYBERNETIKA, 2022, 58 (02) : 163 - 179
  • [6] DISCRETE-TIME NONSTATIONARY AVERAGE STOCHASTIC GAMES
    Liu, Congying
    Zhang, Yining
    Zhang, Wenzhao
    [J]. Journal of Dynamics and Games, 2024, 11 (03): : 265 - 279
  • [7] DISCRETE-TIME NONSTATIONARY AVERAGE STOCHASTIC GAMES
    Liu, Congying
    Zhang, Yining
    Zhang, Wenzhao
    [J]. JOURNAL OF DYNAMICS AND GAMES, 2024, 11 (03): : 265 - 279
  • [8] Covariance Steering for Discrete-Time Linear-Quadratic Stochastic Dynamic Games
    Makkapati, Venkata Ramana
    Rajpurohit, Tanmay
    Okamoto, Kazuhide
    Tsiotras, Panagiotis
    [J]. 2020 59TH IEEE CONFERENCE ON DECISION AND CONTROL (CDC), 2020, : 1771 - 1776
  • [9] Stochastic Discrete-Time Nash Games for Wireless Networks
    Kong Shulan
    Zhang Huanshui
    [J]. PROCEEDINGS OF THE 27TH CHINESE CONTROL CONFERENCE, VOL 6, 2008, : 344 - 348
  • [10] ON OBSERVABILITY OF STOCHASTIC DISCRETE-TIME DYNAMIC SYSTEMS
    AOKI, M
    [J]. JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS, 1968, 286 (01): : 36 - &
12345