论文信息 - Cores of convex games

Cores of convex games

The core of ann-person game is the set of feasible outcomes that cannot be improved upon by any coalition of players. A convex game is defined as one that is based on a convex set function. In this paper it is shown that the core of a convex game is not empty and that it has an especially regular structure. It is further shown that certain other cooperative solution concepts are related in a simple way to the core: The value of a convex game is the center of gravity of the extreme points of the core, and the von Neumann-Morgenstern stable set solution of a convex game is unique and coincides with the core.

L. Shapley

[1] H. Whitney. On the Abstract Properties of Linear Dependence , 1935 .

[2] J. Neumann,et al. Theory of Games and Economic Behavior. , 1945 .

[3] Lloyd S. Shapley. Notes on the n-person game, III : some variants of the von Neumann-Morgenstern definition of solution , 1952 .

[4] G. Choquet. Theory of capacities , 1954 .

[5] Howard Raiffa,et al. Games And Decisions , 1958 .

[6] Donald B. Gillies,et al. 3. Solutions to General Non-Zero-Sum Games , 1959 .

[7] Lloyd S. Shapley,et al. NOTES ON N-PERSON GAMES VII. CORES OF CONVEX GAMES, , 1965 .

[8] COMPOSITION OF GENERAL SUM GAMES. , 1965 .

[9] William F. Lucas. Communications to the Editor—A Counterexample in Game Theory , 1967 .

[10] W. F. Lucas,et al. A Game with No Solution , 1968 .

[11] Joachim Rosenmäller,et al. Some properties of convex set functions , 1971 .

[12] L. Shapley,et al. The kernel and bargaining set for convex games , 1971 .

[13] David Schmeidler,et al. Cores of Exact Games, I* , 1972 .