Sergey S. Ganebny, Sergey S. Kumkov, Stéphane Le Ménec, Valerii S. Patsko, “Numerical Study of a Linear Differential Game with Two Pursuers and One Evader”, Contributions to Game Theory and Management, 2011, Volume 4,Pages <nobr>154

This article is cited in 1 paper

Numerical Study of a Linear Differential Game with Two Pursuers and One Evader

Sergey S. Ganebny^a, Sergey S. Kumkov^a, Stéphane Le Ménec^b, Valerii S. Patsko^a

^a Institute of Mathematics and Mechanics, S. Kovalevskaya str., 16, Ekaterinburg, 620990, Russia
^b EADS/MBDA France, 1 avenue Réaumur, 92358 Le Plessis-Robinson Cedex, France

Abstract: A linear pursuit-evasion differential game with two pursuers and one evader is considered. The pursuers try to minimize the final miss (an ideal situation is to get exact capture), the evader counteracts them. Two case are investigated. In the first case, each one pursuer is dynamically stronger than the evader, in the second one, they are weaker. Results of numerical study of value function level sets (Lebesgue sets) for these cases are given. A method for constructing optimal feedback controls is suggested on the basis of switching lines. Results of numerical simulation are shown.

Keywords: pursuit-evasion differential game, linear dynamics, value function, optimal feedback control.

Language: English