T. Bewley and E. Kohlberg, The asymptotic theory of stochastic games, Mathematics of Operations Research, vol.1, pp.197-208, 1976.

J. A. Filar, Ordered field property for stochastic games when the player who controls transitions changes from state to state, Journal of Optimization Theory and Applications, vol.34, pp.503-515, 1981.

S. K. Frederiksen, Semi-algebraic Tools for Stochastic Games, vol.7, 2015.

D. Gillette, Stochastic games with zero stop probabilities, Contributions to the Theory of Games, vol.3, pp.179-187, 1957.

K. A. Hansen, M. Koucky, N. Lauritzen, P. B. Miltersen, and E. P. Tsigaridas, Exact algorithms for solving stochastic games: extended abstract, STOC 11 Proceedings of the forty-third annual ACM symposium on theory of computing, pp.205-214, 2011.

A. Ja?kiewicz and A. S. Nowak, Nonzero-sum stochastic games, pp.281-344, 2018.

, Zero-sum stochastic games, pp.215-280, 2018.

I. Kaplansky, A contribution to von neumann's theory of games, Annals of Mathematics, vol.46, pp.474-479, 1945.

P. Loustaunau and W. W. Adams, An introduction to gröbner bases, 1994.

S. Maclane and G. Birkhoff, Algebra, The Macmillan Company, 1967.

J. F. Mertens and A. Neyman, Stochastic games, International Journal of Game Theory, vol.10, pp.53-66, 1981.

J. F. Mertens and S. Zamir, Incomplete information games with transcendental values, Mathematics of Operations Research, vol.6, pp.313-318, 1981.

E. Milman, The semi-algebraic theory of stochastic games, Mathematics of Operations Research, vol.27, pp.401-418, 2002.

A. Neyman, Real algebraic tools in stochastic games, pp.57-75, 2003.

T. Parthasarathy and T. E. Raghavan, An orderfield property for stochastic games when one player controls transition probabilities, Journal of Optimization Theory and Applications, vol.33, pp.375-392, 1981.

T. Parthasarathy, S. H. Tijs, and O. J. Vrieze, Stochastic games with state independent transitions and separable rewards, pp.262-271, 1984.

T. E. Raghavan and J. A. Filar, Algorithms for stochastic games -a survey, Zeitschrift für Operations Research, vol.35, pp.437-472, 1991.

T. E. Raghavan, S. H. Tijs, and O. J. Vrieze, On stochastic games with additive reward and transition structure, Journal of Optimization Theory and Applications, vol.47, pp.451-464, 1985.

J. Rotman, Galois theory, 1998.

L. S. Shapley, Stochastic games, Proceedings of the National Academy of Sciences, vol.39, pp.1095-1100, 1953.

L. S. Shapley and R. N. Snow, Basic solutions of discrete games, pp.27-36, 1952.

M. J. Sobel, Myopic solutions of markov decision processes and stochastic games, Operations Research, vol.29, pp.995-1009, 1981.

W. W. Szczechla, S. A. Connell, J. A. Filar, and O. J. Vrieze, On the puiseux series expansion of the limit discount equation of stochastic games, SIAM Journal on Control and Optimization, vol.35, pp.860-875, 1997.

A. Tarski, A decision method for elementary algebra and geometry, 1951.

J. V. Neumann, Zur theorie der gesellschaftsspiele, vol.100, pp.295-320, 1928.

H. , Elementary proof of a minimax theorem due to Von Neumann, pp.19-26, 1952.