Pursuit game

A two-person zero-sum differential game of pursuer (hunter) $P$ and evader (prey) $E$, whose motions are described by systems of differential equations: $$ P : \dot x = f(x,u)\,,\ \ \ E : \dot y = g(y,v) \ . $$

Here, $x,y$ are the phase vectors determining the states of the players $P$ and $E$, respectively, and $u,v$ are control parameters, chosen by the players at each moment of time from given compact sets $U,V$ in Euclidean space. The objective of $P$ can be, e.g., to approach $E$ up to a given distance, which formally means that $x$ falls in some $\ell$-neighbourhood ($\ell > 0$) of $y$. Here one distinguishes between approach with minimum time (pursuit-evasion games), up to a given time (pursuit games with prescribed duration) and up to the moment of arrival of $E$ in a certain set (games with "life-line" ). Games with complete information have been relatively well-studied; here both players know the phase state of each other at every moment of time involved. Solving a pursuit game means finding an equilibrium (cf. Saddle point in game theory).

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Pursuit games are also called games of pursuit or games of pursuit-evasion.

Related to pursuit games are search games with (im-) mobile hider. Such games are usually stochastic, due to incomplete information.

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