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Displaying 21 – 35 of 35

On Sequence-covering mssc-images of Locally Separable Metric Spaces

Nguyen Van Dung (2010)

Publications de l'Institut Mathématique

On spaces with point-countable $k$ -systems

Iwao Yoshioka (2004)

Commentationes Mathematicae Universitatis Carolinae

This paper deals with the behavior of $M$ -spaces, countably bi-quasi- $k$ -spaces and singly bi-quasi- $k$ -spaces with point-countable $k$ -systems. For example, we show that every $M$ -space with a point-countable $k$ -system is locally compact paracompact, and every separable singly bi-quasi- $k$ -space with a point-countable $k$ -system has a countable $k$ -system. Also, we consider equivalent relations among spaces entried in Table 1 in Michael’s paper [15] when the spaces have point-countable $k$ -systems.

On spaces with the property of weak approximation by points

Angelo Bella (1994)

Commentationes Mathematicae Universitatis Carolinae

A sufficient condition that the product of two compact spaces has the property of weak approximation by points (briefly WAP) is given. It follows that the product of the unit interval with a compact WAP space is also a WAP space.

On $𝒦$ -starcompact spaces.

Song, Yan-Kui (2007)

Bulletin of the Malaysian Mathematical Sciences Society. Second Series

On $ℒ$ -starcompact spaces

Yan-Kui Song (2006)

Czechoslovak Mathematical Journal

A space $X$ is $ℒ$ -starcompact if for every open cover $𝒰$ of $X,$ there exists a Lindelöf subset $L$ of $X$ such that $S t (L, 𝒰) = X .$ We clarify the relations between $ℒ$ -starcompact spaces and other related spaces and investigate topological properties of $ℒ$ -starcompact spaces. A question of Hiremath is answered.

On $𝒞$ -starcompact spaces

Yan-Kui Song (2008)

Mathematica Bohemica

A space $X$ is $𝒞$ -starcompact 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.

On the complexity of subspaces of $S_{ω}$

Carlos Uzcátegui (2003)

Fundamenta Mathematicae

Let (X,τ) be a countable topological space. We say that τ is an analytic (resp. Borel) topology if τ as a subset of the Cantor set $2^{X}$ (via characteristic functions) is an analytic (resp. Borel) set. For example, the topology of the Arkhangel’skiĭ-Franklin space $S_{ω}$ is $F_{σ δ}$ . In this paper we study the complexity, in the sense of the Borel hierarchy, of subspaces of $S_{ω}$ . We show that $S_{ω}$ has subspaces with topologies of arbitrarily high Borel rank and it also has subspaces with a non-Borel topology. Moreover,...

On the lattice structure of $T_{1}$ topologies

T. G. Raghavan, I. L. Reilly (1986)

Matematički Vesnik

On the Novák completion of convergence groups

Roman Frič, Martin Gavalec (1983)

Commentationes Mathematicae Universitatis Carolinae

On tightness in chain-net spaces

Ignacio Jané, Paul R. Meyer, Petr Simon, Richard Gordon Wilson (1981)

Commentationes Mathematicae Universitatis Carolinae

On weakly bisequential spaces

Chuan Liu (2000)

Commentationes Mathematicae Universitatis Carolinae

Weakly bisequential spaces were introduced by A.V. Arhangel'skii [1], in this paper. We discuss the relations between weakly bisequential spaces and metric spaces, countably bisequential spaces, Fréchet-Urysohn spaces.

On weak-open $π$ -images of metric spaces

Zhaowen Li (2006)

Czechoslovak Mathematical Journal

In this paper, we give some characterizations of metric spaces under weak-open $π$ -mappings, which prove that a space is $g$ -developable (or Cauchy) if and only if it is a weak-open $π$ -image of a metric space.

On $π$ -images of separable metric spaces and a problem of Shou Lin

Tran Van An, Luong Quoc Tuyen (2012)

Matematički Vesnik

Open maps do not preserve Whyburn property

Franco Obersnel (2003)

Commentationes Mathematicae Universitatis Carolinae

We show that a (weakly) Whyburn space $X$ may be mapped continuously via an open map $f$ onto a non (weakly) Whyburn space $Y$ . This fact may happen even between topological groups $X$ and $Y$ , $f$ a homomorphism, $X$ Whyburn and $Y$ not even weakly Whyburn.

Ordinal invariants in topology II. Sequential order of compactifications

V. Kannan (1979)

Compositio Mathematica

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