๐”– Bobbio Scriptorium
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Note: A geometrical method of solving certain games

โœ Scribed by J. V. Howard

Publisher
John Wiley and Sons
Year
1994
Tongue
English
Weight
173 KB
Volume
41
Category
Article
ISSN
0894-069X

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โœฆ Synopsis

One of the diagrammatic methods for solving two-person 2 x n matrix games can be extended to solve m x n games where each column of the matrix is a concave function of the row number. This gives a simple proof of a theorem of Benjamin and Goldman that such games have solutions involving no more than two consecutive strategies for the row player, and no more than two strategies for the column player. Two extensions are discussed.

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A maximization problem with linear inequality constraints and different kinds of nonconcave objective functions is considered. By means of parametric quadratic programming, the solution of the original problem is reduced to the determination of the absolute maximum of a continuous function of one va