On Zero-sum Optimal Stopping Games

Abstract

On a filtered probability space (,F,P,F=(Ft)t=0,…o,T), we consider stopper-stopper games V:=∈f∈iiτ∈[U((τ),τ)] and V:=∈i∈f∈[U((τ),τ)] in discrete time, where U(s,t) is Fs t-measurable instead of Fs t-measurable as is often assumed in the literature, is the set of stopping times, and i and ii are sets of mappings from to satisfying certain non-anticipativity conditions. We convert the problems into a corresponding Dynkin game, and show that V= V=V, where V is the value of the Dynkin game. We also get the optimal ∈ii and ∈i for V and V respectively.