Subgame-Perfect Equilibria for Stochastic Games

References

• Dubins L. E., Savage L. J.Inequalities for Stochastic Processes (1976) (Dover, New York) Google Scholar
• Fudenberg D., Levine D. Subgame-perfect equilibria of finite- and infinite-horizon games. J. Econom. Theory (1983) 31:251–268Crossref, Google Scholar
• Harris C., Reny P., Robson A. The existence of subgame-perfect equilibrium in continuous games with almost perfect information: A case for public randomization. Econometrica (1995) 63:507–544Crossref, Google Scholar
• Hildenbrand W.Core and Equilibria of a Large Economy (1974) (Princeton University Press, Princeton, NJ) Google Scholar
• Kuratowski K., Ryll-Nardzewski C. A general theorem on selectors. Bull. Polish Acad. Sci. (1965) 22:397–403Google Scholar
• Maitra A. P., Sudderth W. D. Borel stay-in-a-set games. Internat. J. Game Theory (2003) 32:97–108Crossref, Google Scholar
• Maitra A., Pestien V., Ramakrishnan S. Domination by Borel stopping times and some separation properties. Fundamenta Math. (1990) 135:189–201Crossref, Google Scholar
• Mertens J.-F., Neyman A., Sorin S. A measurable “measurable choice” theorem. Stochastic Games and Applications (2003) (Kluwer Academic Publishers, Dordrecht, The Netherlands) 107–130Crossref, Google Scholar
• Mertens J.-F., Parthasarathy T. P., Raghavan T. E. S., Ferguson T. S., Parthasarathy T., Vrieze O. J. Non zero-sum stochastic games. Stochastic Games and Related Topics (1991) (Kluwer Academic Publishers, Dordrecht, The Netherlands) 145–148Crossref, Google Scholar
• Mertens J.-F., Parthasarathy T. P., Neyman A., Sorin S. Equilibria for discounted stochastic games. Stochastic Games and Applications (2003) (Kluwer Academic Publishers, Dordrecht, The Netherlands) 131–172Crossref, Google Scholar
• Moschovakis Y. N.Descriptive Set Theory (1980) (North-Holland, Amsterdam, The Netherlands) Google Scholar
• Nowak A. S. Noncooperative nonstationary stochastic games. Opsearch (1984) 21:199–206Google Scholar
• Nowak A. S., Neyman A., Sorin S. N-person stochastic games: Extensions of the finite state space and correlation. Stochastic Games and Applications (2003a) (Kluwer Academic Publishers, Dordrecht, The Netherlands) 93–106Crossref, Google Scholar
• Nowak A. S. On a new class of nonzero-sum discounted stochastic games having stationary Nash equilibrium points. Internat. J. Game Theory (2003b) 32:121–132Crossref, Google Scholar
• Nowak A. S., Raghavan T. E. S. Existence of stationary correlated equilibria with symmetric information for discounted stochastic games. Math. Oper. Res. (1992) 17:519–526Link, Google Scholar
• Parthasarathy T., Sinha S. Existence of stationary equilibrium strategies in nonzero-sum discounted stochastic games with uncountable state space and state independent transitions. Internat. J. Game Theory (1989) 18:189–194Crossref, Google Scholar
• Rieder U., Raghavan T. E. S., Ferguson T. S., Parthasarathy T., Vrieze O. J. Non-cooperative dynamic games with general utility functions. Stochastic Games and Related Topics (1991) (Kluwer Academic Publishers, Dordrecht, The Netherlands) 161–174Crossref, Google Scholar
• Sengupta S. K. Lower semicontinuous stochastic games with imperfect information. Ann. Statist. (1975) 3:554–558Crossref, Google Scholar
• Solan E. Discounted stochastic games. Math. Oper. Res. (1998) 23:1010–1021Link, Google Scholar
• Solan E., Vieille N. Correlated equilibrium in stochastic games. Games Econom. Behaviour (2002) 38:362–399Crossref, Google Scholar
• Srivastava S. M.A Course on Borel Sets (1998) (Springer-Verlag, New York) Crossref, Google Scholar