A Nonstandard Theory of Games. Part III. Noncooperative Finite Games.

Abstract

A noncooperative framework for *finite games is provided, where the number of participants is assumed to be indexed by an infinite *Finite set. Making use of results obtained in Part II of the series, it is shown that such games have standard non-atomic representations, thus enabling an alternative approach to Theorem 1 of Schmeidler thus enabling an alternative approach to Theorem 1 of Schmeidler. As an additional framework of application, a slight generalization of existing results, on thje ordinal Cores of Simple Games, is provided to the *Finite context.(Author)

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Document Details

Document Type
Technical Report
Publication Date
Jun 01, 1979
Accession Number
ADA072520

Entities

People

  • Alain A. Lewis

Organizations

  • Harvard University

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  • Human Systems

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  • Atomic Structure
  • California
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  • Cooperative Games
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Fields of Study

  • Economics
  • Mathematics

Readers

  • Computational Modeling and Simulation
  • Game Theory.
  • Operations Research