Limit value of dynamic zero-sum games with vanishing stage duration
Abstract
We consider two person zero-sum games where the players control, at discrete times tn induced by a partition of R + , a continuous time Markov state process. We prove that the limit of the values v exist as the mesh of goes to 0. The analysis covers the cases of : 1) stochastic games (where both players know the state) 2) symmetric no information. The proof is by reduction to a deterministic differential game.
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