In this chapter, we extend the notion of discounted payoff to the model of stochastic games, and we define the concept of discounted equilibrium. We then prove that every two-player zero-sum stochastic game admits a discounted value, and that each player has a stationary discounted optimal strategy. The proof uses the same tools we employed in Chapter~\ref{section:mdp} to prove that in Markov decision problems the decision maker has a stationary discounted optimal strategy.

We finally prove that the discounted value is continuous in the parameters of the game, namely the payoff function, the transition function, and the discount factor.