G                         δ                         -topology and compact cardinals

Toshimichi Usuba

doi:10.4064/fm487-7-2018

G _δ -topology and compact cardinals

Toshimichi Usuba^*

^*Corresponding author for this work

School of Fundamental Science and Engineering

Research output: Contribution to journal › Article › peer-review

5 Citations (Scopus)

Abstract

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

Original language	English
Pages (from-to)	71-87
Number of pages	17
Journal	Fundamenta Mathematicae
Volume	246
Issue number	1
DOIs	https://doi.org/10.4064/fm487-7-2018
Publication status	Published - 2019

Keywords

And phrases: cardinal function
G -topology
Lindelöf degree
ω1-strongly compact cardinal

ASJC Scopus subject areas

Algebra and Number Theory

Access to Document

10.4064/fm487-7-2018

Cite this

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title = " G δ -topology and compact cardinals ",

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

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author = "Toshimichi Usuba",

note = "Funding Information: This research was supported by JSPS KAKENHI Grant Nos. 18K03403 and 18K03404. Publisher Copyright: c Instytut Matematyczny PAN, 2019",

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N2 - For a topological space X, let X δ be the space X with the G δ -topology of X. For an uncountable cardinal κ, we prove that the following are equivalent: (1) κ is ω1-strongly compact. (2) For every compact Hausdorff space X, the Lindelöf degree of X δ is ≤ κ. (3) For every compact Hausdorff space X, the weak Lindelöf degree of X δ is ≤ κ. This shows that the least ω1-strongly compact cardinal is the supremum of the Lindelöf and the weak Lindelöf degrees of compact Hausdorff spaces with the G δ -topology. We also prove that the least measurable cardinal is the supremum of the extents of compact Hausdorff spaces with the G δ -topology. For the square of a Lindelöf space, using a weak G δ -topology, we prove that the following are consistent: (1) The least ω1-strongly compact cardinal is the supremum of the (weak) Lindelöf degrees of the squares of regular T1 Lindelöf spaces. (2) The least measurable cardinal is the supremum of the extents of the squares of regular T1 Lindelöf spaces.

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