Abstract
This paper contains the second step in the proof of existence of equilibrium payoffs for two-player stochastic games. It deals with the case of positive absorbing recursive games
Similar content being viewed by others
References
D. Blackwell,Discrete dynamic programming, Annals of Mathematical Statistics33 (1962), 719–726.
H. Everett,Recursive games, inContributions to the Theory of Games, Vol. III (M. Dresher, A. W. Tucker and P. Wolfe, eds.), Princeton University Press, Princeton, N.J., 1957, pp. 47–78.
J. Flesch, F. Thuijsman and O. J. Vrieze,Recursive repeated games with absorbing states, Mathematics of Operations Research21 (1996), 1016–1022.
M. Freidlin and A. Wentzell,Random Perturbations of Dynamical Systems, Springer, Berlin, 1984.
J. F. Mertens and A. Neyman,Stochastic games, International Journal of Game Theory10 (1981), 53–56.
J. F. Mertens, S. Sorin and S. Zamir,Repeated games part b the central results, CORE Discussion Paper 9421, 1994.
D. Rosenberg and N. Vieille,The MaxMin of recursive games with incomplete information on one side, Mathematics of Operations Research,25 (2000), 23–35.
E. Solan,Three-player absorbing games, Mathematics of Operations Research24 (1999), 669–698.
E. Solan,Stochastic games with two non-absorbing states, Israel Journal of Mathematics, this volume, pp. 29–54.
N. Vieille,2-person stochastic games II: The case of recursive games Technical Report 9747, CEREMADE, 1997.
N. Vieille,Small perturbations and stochastic games, Israel Journal of Mathematics, this volume, pp. 127–142.
N. Vieille,Two-player stochastic games I: A reduction Israel Journal of Mathematics, this volume, pp. 55–91.
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Vieille, N. Two-player stochastic games II: The case of recursive games. Isr. J. Math. 119, 93–126 (2000). https://doi.org/10.1007/BF02810664
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF02810664