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The Kernel of the General-Sum Four-Person Game

Published online by Cambridge University Press:  20 November 2018

B. Peleg*
Affiliation:
The Hebrew University, Jerusalem, Israel
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In this paper we apply various results and methods of previous papers on the kernel to four-person games.

Section 2 contains the basic definitions needed. In §3 we prove that the kernel of the general-sum four-person game consists of a line segment (which may shrink to a point). A method for classifying games according to their kernels is suggested in §4 and is used there to characterize all four-person games whose kernel consists of a non-degenerate interval. In the last section, §5, we offer a bargaining procedure, based on principles established in (1), which leads to the kernel in the case of a non-degenerate interval.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1966

References

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2. Hodes, L., Dense linear order and linear inequalities, Research Paper, IBM Corporation, Thomas J. Watson Research Center, Yorktown Heights, N.Y. (March 1963).Google Scholar
3. Maschler, M. and Peleg, B., A characterization, existence proof and dimension bounds for the kernel of a game; applications to the study of simple games, Research Program in Game Theory and Mathematical Economics, R-M 9, Department of Mathematics, The Hebrew University of Jerusalem, Israel (July 1964).Google Scholar
4. Shalhevet, J., On the minimal basis of a completely separating matrix, Research Program in Game Theory and Mathematical Economics, R-M 12, Department of Mathematics, The Hebrew University of Jerusalem, Israel (September 1964).Google Scholar