Zero-sum and nonzero-sum differential games without Isaacs condition

Abstract

In this paper we study the zero-sum and nonzero-sum differential games with not assuming Isaacs condition. Along with the partition π of the time interval [0,T], we choose the suitable random non-anticipative strategy with delay to study our differential games with asymmetric information. Using Fenchel transformation, we prove that the limits of the upper value function Wπ and lower value function Vπ coincide when the mesh of partition π tends to 0. Moreover, we give a characterization for the Nash equilibrium payoff (NEP, for short) of our nonzero-sum differential games without Isaacs condition, then we prove the existence of the NEP of our games. Finally, by considering all the strategies along with all partitions, we give a new characterization for the value of our zero-sum differential game with asymmetric information under some equivalent Isaacs condition.