The core in differential games on networks with communication restrictions

被引:0
|
作者
Tur, Anna V. [1 ]
机构
[1] St Petersburg State Univ, 7-9 Univ Skaya nab, St Petersburg 199034, Russia
来源
VESTNIK SANKT-PETERBURGSKOGO UNIVERSITETA SERIYA 10 PRIKLADNAYA MATEMATIKA INFORMATIKA PROTSESSY UPRAVLENIYA | 2023年 / 19卷 / 04期
基金
俄罗斯科学基金会;
关键词
differential game; network game; cooperative game; core; the Shapley value;
D O I
10.21638/11701/spbu10.2023.406
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
In this paper we consider a class of differential games on networks. It is assumed that the players are identified with the nodes of the network and their interaction takes place along the paths of this network. A characteristic function of a special kind is used, which takes into account the network structure of the game. The C -core is studied as a cooperative optimality principle. An illustrative example is considered.
引用
收藏
页码:497 / 508
页数:12
相关论文
共 50 条
  • [31] Games on networks
    Olafsson, S
    PROCEEDINGS OF THE IEEE, 1997, 85 (10) : 1556 - 1562
  • [32] Games and networks
    D. A. Novikov
    Automation and Remote Control, 2014, 75 : 1145 - 1154
  • [33] Fuzzy restrictions and an application to cooperative games with restricted cooperation
    Gallardo, J. M.
    Jimenez, N.
    Jimenez-Losada, A.
    INTERNATIONAL JOURNAL OF GENERAL SYSTEMS, 2017, 46 (07) : 772 - 790
  • [34] Noncooperative Differential Games
    Bressan, Alberto
    MILAN JOURNAL OF MATHEMATICS, 2011, 79 (02) : 357 - 427
  • [35] Differential Games in L∞
    Barron, E. N.
    DYNAMIC GAMES AND APPLICATIONS, 2017, 7 (02) : 157 - 184
  • [36] Noncooperative Differential Games
    Alberto Bressan
    Milan Journal of Mathematics, 2011, 79 : 357 - 427
  • [37] Strong Time-Consistent Subset of the Core in Cooperative Differential Games with Finite Time Horizon
    O. L. Petrosian
    E. V. Gromova
    S. V. Pogozhev
    Automation and Remote Control, 2018, 79 : 1912 - 1928
  • [38] Strong Time-Consistent Subset of the Core in Cooperative Differential Games with Finite Time Horizon
    Petrosian, O. L.
    Gromova, E. V.
    Pogozhev, S. V.
    AUTOMATION AND REMOTE CONTROL, 2018, 79 (10) : 1912 - 1928
  • [39] The average tree solution for cooperative games with communication structure
    Herings, P. J. J.
    van der Laan, G.
    Talman, A. J. J.
    Yang, Z.
    GAMES AND ECONOMIC BEHAVIOR, 2010, 68 (02) : 626 - 633
  • [40] On the core of cooperative queueing games
    Oezen, Ulas
    Reiman, Martin I.
    Wang, Qiong
    OPERATIONS RESEARCH LETTERS, 2011, 39 (05) : 385 - 389
12345