On quasi-stable sets

Vermeulen, A. J.; Potters, J. A. M.; Jansen, M. J. M.

doi:10.1007/BF01254383

A. J. Vermeulen¹,
J. A. M. Potters¹ &
M. J. M. Jansen²

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Abstract

In this paper it is shown that for a bimatrix game each quasi-stable set is finite.

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Authors and Affiliations

Department of Mathematics, University of Nijmegen, Toernooiveld 1, 6525, ED Nijmegen, The Netherlands
A. J. Vermeulen & J. A. M. Potters
Department of Quantitative Economics, University of Limbung, P.O. Box 616, 6200, MD Maastricht, The Netherlands
M. J. M. Jansen

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A. J. Vermeulen
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J. A. M. Potters
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M. J. M. Jansen
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Vermeulen, A.J., Potters, J.A.M. & Jansen, M.J.M. On quasi-stable sets. Int J Game Theory 25, 43–49 (1996). https://doi.org/10.1007/BF01254383

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Received: 15 September 1993
Revised: 15 July 1994
Issue Date: March 1996
DOI: https://doi.org/10.1007/BF01254383

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On quasi-stable sets

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An elementary proof of the Brouwer’s fixed point theorem

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On quasi-stable sets

Abstract

Access this article

Similar content being viewed by others

An elementary proof of the Brouwer’s fixed point theorem

On the Replication of the Pre-kernel and Related Solutions

On the Hankel matrices of finite rank and generalized Fibonacci sequences

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