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It is established that a remainder of a non-locally compact topological group $G$ has the Baire property if and only if the space $G$ is not Čech-complete. We also show that if $G$ is a non-locally compact topological group of countable tightness, then either $G$ is submetrizable, or $G$ is the Čech-Stone remainder of an arbitrary remainder $Y$ of $G$ . It follows that if $G$ and $H$ are non-submetrizable topological groups of countable tightness such that some remainders of $G$ and $H$ are homeomorphic, then the spaces...

The compactificability classes: The behavior at infinity.

Kovár, Martin Maria (2006)

International Journal of Mathematics and Mathematical Sciences

The dimension of remainders of rim-compact spaces

J. Aarts, E. Coplakova (1993)

Fundamenta Mathematicae

Answering a question of Isbell we show that there exists a rim-compact space X such that every compactification Y of X has dim(Y)≥ 1.

The minimum uniform compactification of a metric space

R. Grant Woods (1995)

Fundamenta Mathematicae

It is shown that associated with each metric space (X,d) there is a compactification $u_{d} X$ of X that can be characterized as the smallest compactification of X to which each bounded uniformly continuous real-valued continuous function with domain X can be extended. Other characterizations of $u_{d} X$ are presented, and a detailed study of the structure of $u_{d} X$ is undertaken. This culminates in a topological characterization of the outgrowth $u_{d} ℝ^{n} ∖ ℝ^{n}$ , where $(ℝ^{n}, d)$ is Euclidean n-space with its usual metric.

The Sorgenfrey line has no connected compactification

Adam Emeryk, Władysław Kulpa (1977)

Commentationes Mathematicae Universitatis Carolinae

The space of complete subgraphs of a graph

Murray G. Bell (1982)

Commentationes Mathematicae Universitatis Carolinae

The subspace of weak $P$ -points of $ℕ^{*}$

Salvador García-Ferreira, Y. F. Ortiz-Castillo (2015)

Commentationes Mathematicae Universitatis Carolinae

Let $W$ be the subspace of $ℕ^{*}$ consisting of all weak $P$ -points. It is not hard to see that $W$ is a pseudocompact space. In this paper we shall prove that this space has stronger pseudocompact properties. Indeed, it is shown that $W$ is a $p$ -pseudocompact space for all $p \in ℕ^{*}$ .

Two types of remainders of topological groups

Aleksander V. Arhangel'skii (2008)

Commentationes Mathematicae Universitatis Carolinae

We prove a Dichotomy Theorem: for each Hausdorff compactification $b G$ of an arbitrary topological group $G$ , the remainder $b G ∖ G$ is either pseudocompact or Lindelöf. It follows that if a remainder of a topological group is paracompact or Dieudonne complete, then the remainder is Lindelöf, and the group is a paracompact $p$ -space. This answers a question in A.V. Arhangel’skii, Some connections between properties of topological groups and of their remainders, Moscow Univ. Math. Bull. 54:3 (1999), 1–6. It is...

Weak extent in normal spaces

Ronnie Levy, Mikhail Matveev (2005)

Commentationes Mathematicae Universitatis Carolinae

If $X$ is a space, then the weak extent $we (X)$ of $X$ is the cardinal $min {α :$ If $𝒰$ is an open cover of $X$ , then there exists $A \subseteq X$ such that $| A | = α$ and $St (A, 𝒰) = X}$ . In this note, we show that if $X$ is a normal space such that $| X | = 𝔠$ and $we (X) = ω$ , then $X$ does not have a closed discrete subset of cardinality $𝔠$ . We show that this result cannot be strengthened in ZFC to get that the extent of $X$ is smaller than $𝔠$ , even if the condition that $we (X) = ω$ is replaced by the stronger condition that $X$ is separable.

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Spaces Y Homeomorphic to ßY Y.

Special lattices of compactifications

Strong remote points

Strongly discrete subsets in ω*

The Baire property in remainders of topological groups and other results

The compactificability classes: The behavior at infinity.

The dimension of remainders of rim-compact spaces

The minimum uniform compactification of a metric space

The Sorgenfrey line has no connected compactification

The space of complete subgraphs of a graph

The subspace of weak $P$ -points of $ℕ^{*}$

Two types of remainders of topological groups

Weak extent in normal spaces

Why certain Čech-Stone remainders are not homogeneous

$α$ -point compactifications

Бикомпактификации переферически бикомпактных пространств

Бикомпактные расширения и совершенные образы приводимых пространств

Currently displaying 61 – 77 of 77