An extension theorem for the class of stochastic games having orderfield property (Q1090633)

We consider a zero-sum stochastic game with finitely many states restricted by the assumption that in some states, the law of transition is controlled by only one player (though the player who controls the transition may vary from state to state within this class of states) and in the rest of the states (a) the law of transition is independent of the states and is a function of the actions of the players only, and (b) the reward is separable, i.e., it can be written as the sum of two functions, one of the states and the other of the actions of the players. We call this type of games SIT-SER/SC Mixture Games and investigate the orderfield property of such games.