Difference between revisions of "Bell-shaped game"
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+ | <TR><TD valign="top">[1]</TD> <TD valign="top"> S. Karlin, "Mathematical methods and theory in games, programming and economics", Addison-Wesley (1959) {{ZBL|0139.12704}}</TD></TR> | ||
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Latest revision as of 12:27, 17 December 2023
A game on the unit square whose pay-off function takes the form $ \phi (x - y) $,
where $ \phi $
is a positive analytic proper Pólya frequency function, i.e.:
1) $ \phi (u) $ is defined for all $ u \in (- \infty , \infty ) $;
2) for any $ n $ and any sets $ - \infty < x _ {1} < \dots < x _ {n} < \infty $ and $ - \infty < y _ {1} < \dots < y _ {n} < \infty $ there is an inequality $ \mathop{\rm det} \| \phi (x _ {i} - y _ {j} ) \| \geq 0 $;
3) for any set $ \{ x _ {k} \} $( correspondingly, $ \{ y _ {k} \} $) there is a set $ \{ y _ {k} \} $( correspondingly, $ \{ x _ {k} \} $) such that $ \mathop{\rm det} \| \phi (x _ {i} - y _ {j} ) \| > 0 $;
4) $ \int _ {- \infty } ^ \infty \phi (u) du < \infty $.
An example of a bell-shaped game is a game with pay-off function $ e ^ {- (x - y) ^ {2} } $. The optimal strategies of players in a bell-shaped game are unique and are piecewise-constant distributions with a finite number of steps. The value of a game with pay-off function $ \phi ( \lambda (x - y)) $, as $ \lambda \rightarrow \infty $, moves towards zero, while the number of points in the supports of the optimal strategies grows unboundedly.
References
[1] | S. Karlin, "Mathematical methods and theory in games, programming and economics", Addison-Wesley (1959) Zbl 0139.12704 |
Bell-shaped game. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Bell-shaped_game&oldid=54794