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Contributions to Game Theory and Management, 2013, Volume 6, Pages 362–376
(Mi cgtm132)
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Two Approaches for Solving a Group Pursuit Game
Yaroslavna B. Pankratovaab, Svetlana I. Tarashninaa
a St. Petersburg State University,
Faculty of Applied Mathematics and Control Processes,
Universitetsky pr. 35, St. Petersburg, 198504, Russia
b International Banking Institute,
Nevsky prospect 60, St. Petersburg, 191023, Russia
Abstract:
In this paper we study a game of group pursuit in which players move on a plane with bounded velocities. The game is supposed to be a nonzero-sum simple pursuit game between a pursuer and $m$ evaders acting independently of each other. The case of complete information is considered. Here we assume that the evaders are discriminated. Two different approaches to formalize this pursuit problem are considered: noncooperative and cooperative. In a noncooperative case we construct a Nash equilibrium, and in a cooperative case we construct the core. We proved that the core is not empty for any initial positions of the players.
Keywords:
group pursuit game, Nash equilibrium, realizability area, TU-game, core.
Citation:
Yaroslavna B. Pankratova, Svetlana I. Tarashnina, “Two Approaches for Solving a Group Pursuit Game”, Contributions to Game Theory and Management, 6 (2013), 362–376
Linking options:
https://www.mathnet.ru/eng/cgtm132 https://www.mathnet.ru/eng/cgtm/v6/p362
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| Statistics & downloads: |
| Abstract page: | 160 | | Full-text PDF : | 98 | | References: | 35 |
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