Some observations on a clopen version of the Rothberger property

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DOI:

https://doi.org/10.56754/0719-0646.2502.161

Abstract

In this paper, we prove that a clopen version \(S_1(\mathcal{C}_\mathcal{O}, \mathcal{C}_\mathcal{O})\) of the Rothberger property  and Borel strong measure zeroness are independent. For a zero-dimensional metric space \((X,d)\), \(X\) satisfies \(S_1(\mathcal{C}_\mathcal{O}, \mathcal{C}_\mathcal{O})\) if, and only if, \(X\) has Borel strong measure zero with respect to each metric which has the same topology as \(d\) has. In a zero-dimensional space, the game \(G_1(\mathcal{O}, \mathcal{O})\) is equivalent to the game \(G_1(\mathcal{C}_\mathcal{O}, \mathcal{C}_\mathcal{O})\) and the point-open game is equivalent to the point-clopen game. Using reflections, we obtain that the game \(G_1(\mathcal{C}_\mathcal{O}, \mathcal{C}_\mathcal{O})\) and the point-clopen game are strategically and Markov dual. An example is given for a space on which the game \(G_1(\mathcal{C}_\mathcal{O}, \mathcal{C}_\mathcal{O})\) is undetermined.

Keywords

Strong measure zero , selection principles , point-clopen game , zero-dimensional space

Mathematics Subject Classification:

54D20 , 54A20
  • Pages: 161–172
  • Date Published: 2023-07-19
  • Vol. 25 No. 2 (2023)

E. Borel, “Sur la classification des ensembles de mesure nulle”, Bull. Soc. Math. France, vol. 47, pp. 97–125, 1919.

M. Bhardwaj and A. V. Osipov, “Mildly version of Hurewicz basis covering property and Hurewicz measure zero spaces”, Bull. Belg. Math. Soc. Simon Stevin, vol. 29, no. 1, pp. 123–133, 2022.

M. Bhardwaj and A. V. Osipov, “Some observations on the mildly Menger property and topological games”, Filomat, vol. 36, no. 15, pp. 5289–5296, 2022.

M. Bhardwaj and A. V. Osipov, “Star versions of the Hurewicz basis covering property and strong measure zero spaces”, Turkish J. Math., vol. 44, no. 3, pp. 1042–1053, 2020.

S. Clontz and J. Holshouser, “Limited information strategies and discrete selectivity”, Topology Appl., vol. 265, Art. ID 106815, 2019.

S. Clontz, “Dual selection games”, Topology Appl., vol. 272, Art. ID 107056, 2020.

R. Engelking, General Topology, Revised and completed edition. Berlin, Germany: Heldermann Verlag, 1989.

F. Galvin, “Indeterminacy of point-open games”, Bull. Acad. Pol. Sci., vol. 26, no. 5, pp. 445–449, 1978.

W. Hurewicz, “Über eine verallgemeinerung des Borelschen theorems”, Math. Z., vol. 24, pp. 401–421, 1925.

A. W. Miller and D. H. Fremlin, “Some properties of Hurewicz, Menger and Rothberger”, Fund. Math., vol. 129, pp. 17–33, 1988.

J. Pawlikowski, “Undetermined sets of point-open games”, Fund. Math., vol. 144, pp. 279–285, 1994.

F. Rothberger, “Eine Verschörfung der Eigenschaft C”, Fund. Math., vol. 30, pp. 50–55, 1938.

M. Scheepers, “Combinatorics of open covers (I): Ramsey theory”, Topology Appl., vol. 69, no. 1, pp. 31–62, 1996.

R. Telgársky, “Spaces defined by topological games”, Fund. Math., vol. 88, pp. 193–223, 1975.

  • Ministry of Science and Higher Education of the Russian Federation

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Published

2023-07-19

How to Cite

[1]
M. Bhardwaj and A. V. Osipov, “Some observations on a clopen version of the Rothberger property”, CUBO, pp. 161–172, Jul. 2023.

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Vol. 25 No. 2 (2023)

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Copyright (c) 2023 Manoj Bhardwaj et al.

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