Ashkenazi-Golan, Galit, Flesch, János, Predtetchinski, Arkadi and Solan, Eilon (2022) Regularity of the minmax value and equilibria in multiplayer Blackwell games. Israel Journal of Mathematics. ISSN 0021-2172 (In Press)
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Text (Regularity of the minmax value and equilibria in multiplayer Blackwell games)
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Abstract
A real-valued function j that is defined over all Borel sets of a topological space is regular if for every Borel set W, j(W) is the supremum of j(C), over all closed sets C that are contained in W, and the infimum of j(O), over all open sets O that contain W. We study Blackwell games with finitely many players. We show that when each player has a countable set of actions and the objective of a certain player is represented by a Borel winning set, that player’s minmax value is regular. We then use the regularity of the minmax value to establish the existence of #-equilibria in two distinct classes of Blackwell games. One is the class of n-player Blackwell games where each player has a finite action space and an analytic winning set, and the sum of the minmax values over the players exceeds n 1. The other class is that of Blackwell games with bounded upper semi-analytic payoff functions, history-independent finite action spaces, and history-independent minmax values. For the latter class, we obtain a characterization of the set of equilibrium payoffs.
| Item Type: | Article |
|---|---|
| Additional Information: | © 2022 Springer. |
| Divisions: | Mathematics |
| Subjects: | Q Science > QA Mathematics |
| Date Deposited: | 17 Oct 2022 14:09 |
| Last Modified: | 14 Sep 2024 09:18 |
| URI: | http://eprints.lse.ac.uk/id/eprint/117118 |
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