Please use this identifier to cite or link to this item: https://doi.org/10.1007/s00182-005-0004-3
Title: The Dvoretzky-Wald-Wolfowitz theorem and purification in atomless finite-action games
Authors: Khan, M.A.
Rath, K.P.
Sun, Y. 
Keywords: Atomless
DWW theorem
Mixed and pure strategies equilibria
Purification
Randomization
Issue Date: Apr-2006
Citation: Khan, M.A., Rath, K.P., Sun, Y. (2006-04). The Dvoretzky-Wald-Wolfowitz theorem and purification in atomless finite-action games. International Journal of Game Theory 34 (1) : 91-104. ScholarBank@NUS Repository. https://doi.org/10.1007/s00182-005-0004-3
Abstract: In 1951, Dvoretzky, Wald and Wolfowitz (henceforth DWW) showed that corresponding to any mixed strategy into a finite action space, there exists a pure-strategy with an identical integral with respect to a finite set of atomless measures. DWW used their theorem for purification: the elimination of randomness in statistical decision procedures and in zero-sum two-person games. In this short essay, we apply a consequence of their theorem to a finite-action setting of finite games with incomplete and private information, as well as to that of large games. In addition to simplified proofs and conceptual clarifications, the unification of results offered here re-emphasizes the close connection between statistical decision theory and the theory of games.
Source Title: International Journal of Game Theory
URI: http://scholarbank.nus.edu.sg/handle/10635/104283
ISSN: 00207276
DOI: 10.1007/s00182-005-0004-3
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