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Strongly sequentially separable function spaces
- Speaker(s)
- Piotr Szewczak
- Affiliation
- Cardinal Stefan Wyszyński University in Warsaw
- Date
- March 23, 2022, 4:15 p.m.
- Room
- room 4420
- Seminar
- Topology and Set Theory Seminar
A space is Frechet–Urysohn if each point in the closure of a set is a limit of a sequence from the set. A separable space is strongly sequentially separable if, for each countable dense set, every point in the space is a limit of a sequence from the dense set. Applying methods of selection principles, we solve the following problem.
Problem (Gartside—Lo—Marsh [1]). Is there, consistently, a Tychonoff space X of cardinality at least p such the space Cp(X) is strongly sequentially separable but not Frechet–Urysohn?
This is a joint work with Alexander V. Osipov and Boaz Tsaban.
References
[1] P. Gartside, J. Lo, A. Marsh, Sequential density, Topology and its Applications 130 (2003), 75–86.
[2] A. Osipov, P. Szewczak, B. Tsaban, Strongly sequentially separable function spaces, via selection principles, Topology and its Applications 270 (2020), 107048.
