Content-Length: 69265 | pFad | http://en.m.wikipedia.org/wiki/Bondareva%E2%80%93Shapley_theorem

Bondareva–Shapley theorem - Wikipedia

Bondareva–Shapley theorem

The Bondareva–Shapley theorem, in game theory, describes a necessary and sufficient condition for the non-emptiness of the core of a cooperative game in characteristic function form. Specifically, the game's core is non-empty if and only if the game is balanced. The Bondareva–Shapley theorem implies that market games and convex games have non-empty cores. The theorem was formulated independently by Olga Bondareva and Lloyd Shapley in the 1960s.

Theorem

edit

Let the pair   be a cooperative game in characteristic function form, where   is the set of players and where the value function   is defined on  's power set (the set of all subsets of  ).

The core of   is non-empty if and only if for every function   where

 
the following condition holds:

 

References

edit
  • Bondareva, Olga N. (1963). "Some applications of linear programming methods to the theory of cooperative games (In Russian)" (PDF). Problemy Kybernetiki. 10: 119–139.
  • Kannai, Y (1992), "The core and balancedness", in Aumann, Robert J.; Hart, Sergiu (eds.), Handbook of Game Theory with Economic Applications, Volume I., Amsterdam: Elsevier, pp. 355–395, ISBN 978-0-444-88098-7
  • Shapley, Lloyd S. (1967). "On balanced sets and cores". Naval Research Logistics Quarterly. 14 (4): 453–460. doi:10.1002/nav.3800140404. hdl:10338.dmlcz/135729.








ApplySandwichStrip

pFad - (p)hone/(F)rame/(a)nonymizer/(d)eclutterfier!      Saves Data!


--- a PPN by Garber Painting Akron. With Image Size Reduction included!

Fetched URL: http://en.m.wikipedia.org/wiki/Bondareva%E2%80%93Shapley_theorem

Alternative Proxies:

Alternative Proxy

pFad Proxy

pFad v3 Proxy

pFad v4 Proxy