Gδ-topology and compact cardinals

Abstract

For a topological space X, let Xδ be the space X with Gδ-topology of X. For an uncountable cardinal , we prove that the following are equivalent: (1) is ω1-strongly compact. (2) For every compact Hausdorff space X, the Lindel\"of degree of Xδ is . (3) For every compact Hausdorff space X, the weak Lindel\"of degree of Xδ is . This shows that the least ω1-strongly compact cardinal is the supremum of the Lindel\"of and the weak Lindel\"of degrees of compact Hausdorff spaces with Gδ-topology. We also prove the least measurable cardinal is the supremum of the extents of compact Hausdorff spaces with Gδ-topology. For the square of a Lindel\"of space, using weak Gδ-topology, we prove that the following are consistent: (1) the least ω1-strongly compact cardinal is the supremum of the (weak) Lindel\"of degrees of the squares of regular T1 Lindel\"of spaces. (2) The least measurable cardinal is the supremum of the extents of the squares of regular T1 Lindel\"of spaces.