Convergence in compacta and linear Lindelöfness

Aleksander V. Arhangel'skii; Raushan Z. Buzyakova

Displaying similar documents to “Convergence in compacta and linear Lindelöfness”

On $𝒞$ -starcompact spaces

Yan-Kui Song (2008)

Mathematica Bohemica

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A space $X$ is if for every open cover $𝒰$ of $X,$ there exists a countably compact subset $C$ of $X$ such that $St (C, 𝒰) = X .$ In this paper we investigate the relations between $𝒞$ -starcompact spaces and other related spaces, and also study topological properties of $𝒞$ -starcompact spaces.

In search for Lindelöf $C_{p}$ ’s

Raushan Z. Buzyakova (2004)

Commentationes Mathematicae Universitatis Carolinae

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It is shown that if $X$ is a first-countable countably compact subspace of ordinals then $C_{p} (X)$ is Lindelöf. This result is used to construct an example of a countably compact space $X$ such that the extent of $C_{p} (X)$ is less than the Lindelöf number of $C_{p} (X)$ . This example answers negatively Reznichenko’s question whether Baturov’s theorem holds for countably compact spaces.

Spaces with large star cardinal number

Yan-Kui Song (2012)

Commentationes Mathematicae Universitatis Carolinae

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In this paper, we prove the following statements: (1) For any cardinal $κ$ , there exists a Tychonoff star-Lindelöf space $X$ such that $a (X) \geq κ$ . (2) There is a Tychonoff discretely star-Lindelöf space $X$ such that $a a (X)$ does not exist. (3) For any cardinal $κ$ , there exists a Tychonoff pseudocompact $σ$ -starcompact space $X$ such that $st - l (X) \geq κ$ .

Displaying similar documents to “Convergence in compacta and linear Lindelöfness”

On 𝒞 -starcompact spaces

In search for Lindelöf C p ’s

Spaces with large star cardinal number

On $𝒞$ -starcompact spaces

In search for Lindelöf $C_{p}$ ’s