Absorbing Games with Compact Action Spaces

References

• Bewley T., Kohlberg E. The asymptotic theory of stochastic games. Math. Oper. Res. (1976) 1:197–208Link, Google Scholar
• Blackwell D., Ferguson T. S. The big match. Ann. Math. Statist. (1968) 39:159–168Crossref, Google Scholar
• Kohlberg E. Repeated games with absorbing states. Ann. Statist. (1974) 2:724–738Crossref, Google Scholar
• Kuratowski K., Ryll-Nardzewski C. A general theorem on selectors. Bull. Polish Acad. Sci. (Ser. Math.) (1965) 13:379–403Google Scholar
• Maitra A., Sudderth W. D. An operator solution for stochastic games. Israel J. Math. (1992) 78:33–49Crossref, Google Scholar
• Maitra A., Sudderth W. D. Borel stochastic games with limsup payoff. Ann. Probab. (1993) 21:861–885Crossref, Google Scholar
• Mertens J. F., Neyman A. Stochastic games. (1980) . Core Discussion Paper 8001, Université Catholique de Louvain-la-Neuve, BelgiumGoogle Scholar
• Mertens J. F., Neyman A. Stochastic games. Internat. J. Game Theory (1981) 10:53–66Crossref, Google Scholar
• Mertens J. F., Sorin S., Zamir S. Repeated games. (1994) . Core Discussion Papers 9420, 9421, 9422, Université Catholique de Louvain-la-Neuve, BelgiumGoogle Scholar
• Neyman A., Neyman A., Sorin S. Stochastic games: Existence of the minmax. Stochastic Games and Applications, Vol. 570. Mathematical and Physical Sciences (2003) (Kluwer Academic Publishers, Dordrecht, The Netherlands) 57–75NATO Science Series CCrossref, Google Scholar
• Rosenberg D., Sorin S. An operator approach to stochastic games. Israël J. Math. (2001) 121:221–246Crossref, Google Scholar
• Rosenberg D., Solan E., Vieille N. The maxmin value of stochastic games with imperfect monitoring. Internat. J. Game Theory (2003) 32:133–150Crossref, Google Scholar
• Shapley L. Stochastic games. Proc. National Acad. Sci. (1953) 39:1095–1100Crossref, Google Scholar