Abstract
Arhangel'skii proved that if a first countable Hausdorff space is Lindelöf, then its cardinality is at most 2 א0 . Such a clean upper bound for Lindelöf spaces in the larger class of spaces whose points are G δ has been more elusive. In this paper we continue the agenda started by the second author, [Topology Appl. 63 (1995)], of considering the cardinality problem for spaces satisfying stronger versions of the Lindelöf property. Infinite games and selection principles, especially the Rothberger property, are essential tools in our investigations.
| Original language | American English |
|---|---|
| Pages (from-to) | 1-46 |
| Number of pages | 46 |
| Journal | Fundamenta Mathematicae |
| Volume | 210 |
| Issue number | 1 |
| DOIs | |
| State | Published - 1 Oct 2010 |
Keywords
- Cohen reals
- Gerlits - Nagy space
- Hurewicz property
- Indestructibly lindelöf
- Infinite game
- Measurable cardinal
- Menger property
- Random reals
- Real-valued measurable cardinal
- Rothberger space
- Weakly compact cardinal
EGS Disciplines
- Mathematics