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SHORTENING CLOPEN GAMES

Published online by Cambridge University Press:  08 January 2021

JUAN P. AGUILERA*
Affiliation:
DEPARTMENT OF MATHEMATICS GHENT UNIVERSITY KRIJGSLAAN 281-S8, 9000 GHENT, BELGIUM and INSTITUTE OF DISCRETE MATHEMATICS AND GEOMETRY VIENNA UNIVERSITY OF TECHNOLOGY WIEDNER HAUPTSTRASSE 8–10, 1040 VIENNA, AUSTRIAE-mail: [email protected]

Abstract

For every countable wellordering $\alpha $ greater than $\omega $ , it is shown that clopen determinacy for games of length $\alpha $ with moves in $\mathbb {N}$ is equivalent to determinacy for a class of shorter games, but with more complicated payoff. In particular, it is shown that clopen determinacy for games of length $\omega ^2$ is equivalent to $\sigma $ -projective determinacy for games of length $\omega $ and that clopen determinacy for games of length $\omega ^3$ is equivalent to determinacy for games of length $\omega ^2$ in the smallest $\sigma $ -algebra on $\mathbb {R}$ containing all open sets and closed under the real game quantifier.

Type
Article
Copyright
© Association for Symbolic Logic 2021

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References

Aguilera, J. P., $\sigma$ -Projective determinacy, to appear, 2018.Google Scholar
Aguilera, J. P., Between the finite and the infinite, Ph.D. thesis, Vienna University of Technology, 2019.Google Scholar
Aguilera, J. P., Müller, S., and Schlicht, P., Long games and $\sigma$ -projective sets. Annals of Pure and Applied Logic, vol. 172 (2021).10.1016/j.apal.2020.102939CrossRefGoogle Scholar
Blass, A., Equivalence of two strong forms of determinacy. Proceedings of the American Mathematical Society, vol. 52 (1975), pp. 373376.10.1090/S0002-9939-1975-0373903-XCrossRefGoogle Scholar
Gale, D. and Stewart, F. M., Infinite games with perfect information, Contributions to the Theory of Games , vol. 2 (H. W. Kuhn and A. W. Tucker, editors), Princeton University Press, Princeton, 1953, pp. 245266.Google Scholar
Harrington, L., Analytic determinacy and 0# , this Journal, vol. 43 (1978), pp. 685693.Google Scholar
Martin, D. A., Borel determinacy . Annals of Mathematics, vol. 102 (1975), no. 2, pp. 363371.CrossRefGoogle Scholar
Martin, D. A., Determinacy of infinitely long games, Book draft dated March 2020.Google Scholar
Moschovakis, Y. N., Elementary Induction on Abstract Structures, Studies in Logic and the Foundations of Mathematics, Elsevier, Amsterdam, 1974.Google Scholar
Moschovakis, Y. N., Descriptive Set Theory, second ed., Mathematical Surveys and Monographs, vol. 155, American Mathematical Society, Providence, RI, 2009.10.1090/surv/155CrossRefGoogle Scholar
Trang, N. D., Generalized Solovay measures, the HOD analysis, and the core model induction, Ph.D. thesis, University of California at Berkeley, 2013.Google Scholar
Welch, P. D., Determinacy in strong cardinal models , this Journal, vol. 76 (2011), pp. 719728.Google Scholar