MONOTONICITY OF THE CORE AND VALUE IN DYNAMIC COOPERATIVE GAMES

被引:18
|
作者
ROSENTHAL, EC
机构
[1] Department of Management Science and Operations Management, School of Business and Management, Temple University, Philadelphia, 19122, PA
来源
INTERNATIONAL JOURNAL OF GAME THEORY | 1990年 / 19卷 / 01期
关键词
Cooperative games; core; monotonicity; Shapley value;
D O I
10.1007/BF01753707
中图分类号
F [经济];
学科分类号
02 ;
摘要
We examine behavior of the core and value of certain classes of cooperative games in which a dynamic aspect is introduced. New players are added to the games while the underlying structure is held constant. This is done by considering games that satisfy properties like convexity, or games that are derived from optimization problems in which a player's addition can be defined naturally. For such games we give conditions regarding monotonicity of the core and value. © 1990 Physica-Verlag.
引用
收藏
页码:45 / 57
页数:13
相关论文
共 50 条
  • [21] On cooperative games with large monotonic core
    Jesús Getán
    Jesús Montes
    [J]. TOP, 2010, 18 : 493 - 508
  • [22] The Core of Aggregative Cooperative Games with Externalities
    Stamatopoulos, Giorgos
    [J]. B E JOURNAL OF THEORETICAL ECONOMICS, 2016, 16 (01): : 389 - 410
  • [23] On cooperative games with large monotonic core
    Getan, Jesus
    Montes, Jesus
    [J]. TOP, 2010, 18 (02) : 493 - 508
  • [24] Comment on "A new approach of cooperative interval games: The interval core and Shapley value revisited"
    Gallardo, J. M.
    Jimenez-Losada, A.
    [J]. OPERATIONS RESEARCH LETTERS, 2018, 46 (04) : 434 - 437
  • [25] Monotonicity implies linearity: characterizations of convex combinations of solutions to cooperative games
    Yokote, Koji
    Funaki, Yukihiko
    [J]. SOCIAL CHOICE AND WELFARE, 2017, 49 (01) : 171 - 203
  • [26] Weak differential monotonicity and axiomatization of convex combinations of solutions to cooperative games
    Cui, Zeguang
    Shan, Erfang
    Lyu, Wenrong
    [J]. TOP, 2024,
  • [27] Monotonicity implies linearity: characterizations of convex combinations of solutions to cooperative games
    Koji Yokote
    Yukihiko Funaki
    [J]. Social Choice and Welfare, 2017, 49 : 171 - 203
  • [28] An average lexicographic value for cooperative games
    Tijs, Stef
    Borm, Peter
    Lohmann, Edwin
    Quant, Marieke
    [J]. EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2011, 213 (01) : 210 - 220
  • [29] A value for bi-cooperative games
    Christophe Labreuche
    Michel Grabisch
    [J]. International Journal of Game Theory, 2008, 37 : 409 - 438
  • [30] The proportional value for positive cooperative games
    Ortmann, KM
    [J]. MATHEMATICAL METHODS OF OPERATIONS RESEARCH, 2000, 51 (02) : 235 - 248
12345