Difference between revisions of "Recursive game"

A [[Stochastic game|stochastic game]] with pay-off at the end of a play (see also [[Dynamic game|Dynamic game]]). Since a recursive game can be endless, it is essential to determine the pay-off of the players in the case of infinite plays. An analysis of any Shapley game can be reduced to an analysis of a certain recursive game, but because of the possibility of infinite plays, research on recursive games is generally more complicated than research on stochastic games. Any zero-sum two-person finite recursive game has a value and both players have stationary <img align="absmiddle" border="0" src="https://www.encyclopediaofmath.org/legacyimages/r/r080/r080270/r0802701.png" />-optimal strategies. H. Everett [[#References|[1]]] has demonstrated a method of finding both the value of the game and of the optimal strategies.