Lindelof indestructibility, topological games and selection principles

Abstract

Arhangel'skii proved that if a first countable Hausdorff space is Lindel\"of, then its cardinality is at most 20. Such a clean upper bound for Lindel\"of spaces in the larger class of spaces whose points are Gδ has been more elusive. In this paper we continue the agenda started in F.D. Tall, On the cardinality of Lindel\"of spaces with points Gδ, Topology and its Applications 63 (1995), 21 - 38, of considering the cardinality problem for spaces satisfying stronger versions of the Lindel\"of property. Infinite games and selection principles, especially the Rothberger property, are essential tools in our investigations