On the Value of Information Structures in Stochastic Games

This paper studies how improved monitoring affects the limit equilibrium payoff set for stochastic games with imperfect public monitoring. We introduce a simple generalization of Blackwell garbling called weighted garbling in order to compare different information structures for this class of games. Our main result is the monotonicity of the limit perfect public equilibrium (PPE) payoff set with respect to this information order: we show that the limit PPE payoff sets with one information structure is larger than the limit PPE payoff sets with another information structure state by state if the latter information structure is a weighted garbling of the former. We show that this monotonicity result also holds for the class of strongly symmetric equilibrium. Finally, we introduce and discuss another weaker sufficient condition for the expansion of limit PPE payoff set. It is more complex and difficult to verify, but useful in some special cases.