Selection Principles in Mathematics
 

[Home] [Meetings] [Literature] [Research Problems] [Researchers][SPM bulletin]

  Classical selection properties and Games

1. F. Galvin, Indeterminacy of point-open games, Bull. Acad. Polon. Sci. 26 (1978), 445 - 448
2. G. Gruenhage, Infinite games and generalizations of First-Countable spaces, General Topology and its Applications 6 (1976), 339 - 352
3. G. Gruenhage, Games, covering properties and Eberlein compacts, Topology and its Applications 23 (1986), 291 - 297.
4. J. Pawlikowski, Undetermined sets of point-open games, Fundamenta Mathematicae 144 (1994), 279 -- 285
5. M. Scheepers, A direct proof of a theorem of Telgarsky, Proceedings of the American Mathematical Society 123 (1995), 3483 - 3485.
6. M. Scheepers, Strong measure zero subsets of the real line and an infinite game, Proceedings of the II Mathematical Conference in Pristina (1996), 61 - 65.
7. M. Scheepers, The length of some diagonalization games, Archive for Mathematical Logic (1999) 38, 103 - 122.
8. M. Scheepers, W. Just, P. Szeptycki, J. Steprans, G-delta sets in topological spaces and games, Fundamenta Mathematicae 153 (1997) 41-58.
9. M.Scheepers, P. Szeptycki, Some games related to perfect spaces, East West Journal of Mathematics, 2 (2000) 85-107.
10. P.L. Sharma, Some characterizations of W-spaces and w-spaces, General Topology and its Applications 9 (1978), 289 - 293
11. R. Telgarsky, Spaces defined by topological games, Fundamenta Mathematicae 88 (1975), 193 -- 223
12. R. Telgarsky, Spaces defined by topological games, II, Fundamenta Mathematicae 116 (1983), 189 -- 207
13. R Telgarsky, On games of Topsoe, Mathematica Scandinavica 54 (1984), 170-176
14. V.V. Tkachuk, Some new versions of an old game, Comment. Math. Univ. Carolinae 36 (1995), 177 - 196