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Displaying 21 – 40 of 45

Classifying stationary sets: a survey

Lutzer, David J. (1978)

Seminar Uniform Spaces

Closed discrete subsets of separable spaces and relative versions of normality, countable paracompactness and property $(a)$

Samuel Gomes da Silva (2011)

Commentationes Mathematicae Universitatis Carolinae

In this paper we show that a separable space cannot include closed discrete subsets which have the cardinality of the continuum and satisfy relative versions of any of the following topological properties: normality, countable paracompactness and property $(a)$ . It follows that it is consistent that closed discrete subsets of a separable space $X$ which are also relatively normal (relatively countably paracompact, relatively $(a)$ ) in $X$ are necessarily countable. There are, however, consistent examples of...

Closure, interior, and union in finite topological spaces

Louise E. Moser (1977)

Colloquium Mathematicae

Cofinal families in certain function spaces

William Wistar Comfort (1988)

Commentationes Mathematicae Universitatis Carolinae

Collectionwise Hausdorffness at limit cardinals

Nobuyuki Kemoto (1991)

Fundamenta Mathematicae

Coloring Cantor sets and resolvability of pseudocompact spaces

István Juhász, Lajos Soukup, Zoltán Szentmiklóssy (2018)

Commentationes Mathematicae Universitatis Carolinae

Let us denote by $Φ (λ, μ)$ the statement that $𝔹 (λ) = D {(λ)}^{ω}$ , i.e. the Baire space of weight $λ$ , has a coloring with $μ$ colors such that every homeomorphic copy of the Cantor set $ℂ$ in $𝔹 (λ)$ picks up all the $μ$ colors. We call a space $X$ $π$ -regular if it is Hausdorff and for every nonempty open set $U$ in $X$ there is a nonempty open set $V$ such that $\bar{V} \subset U$ . We recall that a space $X$ is called feebly compact if...

Combinatorial aspects of measure and category

Tomek Bartoszyński (1987)

Fundamenta Mathematicae

Combinatorics of open covers (VII): Groupability

Ljubiša D. R. Kočinac, Marion Scheepers (2003)

Fundamenta Mathematicae

We use Ramseyan partition relations to characterize: ∙ the classical covering property of Hurewicz; ∙ the covering property of Gerlits and Nagy; ∙ the combinatorial cardinal numbers and add(ℳ ). Let X be a $T_{31 / 2}$ -space. In [9] we showed that $C_{p} (X)$ has countable strong fan tightness as well as the Reznichenko property if, and only if, all finite powers of X have the Gerlits-Nagy covering property. Now we show that the following are equivalent: 1. $C_{p} (X)$ has countable fan tightness and the Reznichenko property. 2....

Compact sets without converging sequences in the random real model.

Dow, A., Fremlin, D. (2007)

Acta Mathematica Universitatis Comenianae. New Series

Compacta are maximally $G_{δ}$ -resolvable

István Juhász, Zoltán Szentmiklóssy (2013)

Commentationes Mathematicae Universitatis Carolinae

It is well-known that compacta (i.e. compact Hausdorff spaces) are maximally resolvable, that is every compactum $X$ contains $Δ (X)$ many pairwise disjoint dense subsets, where $Δ (X)$ denotes the minimum size of a non-empty open set in $X$ . The aim of this note is to prove the following analogous result: Every compactum $X$ contains $Δ_{δ} (X)$ many pairwise disjoint $G_{δ}$ -dense subsets, where $Δ_{δ} (X)$ denotes the minimum size of a non-empty $G_{δ}$ set in $X$ .

Compact-calibres of regular and monotonically normal spaces.

McIntyre, David W. (2002)

International Journal of Mathematics and Mathematical Sciences

Compact-covering numbers

George Baloglou, W. Comfort (1988)

Fundamenta Mathematicae

Compactification and the continuum hypothesis

James Keesling (1970)

Fundamenta Mathematicae

Compactness of Powers of ω

Paolo Lipparini (2013)

Bulletin of the Polish Academy of Sciences. Mathematics

We characterize exactly the compactness properties of the product of κ copies of the space ω with the discrete topology. The characterization involves uniform ultrafilters, infinitary languages, and the existence of nonstandard elements in elementary extensions. We also have results involving products of possibly uncountable regular cardinals.

Concerning certain minimal cover refineable spaces

U. Christian (1972)

Fundamenta Mathematicae

Connected LCA groups are sequentially connected

Shou Lin, Mihail G. Tkachenko (2013)

Commentationes Mathematicae Universitatis Carolinae

We prove that every connected locally compact Abelian topological group is sequentially connected, i.e., it cannot be the union of two proper disjoint sequentially closed subsets. This fact is then applied to the study of extensions of topological groups. We show, in particular, that if $H$ is a connected locally compact Abelian subgroup of a Hausdorff topological group $G$ and the quotient space $G / H$ is sequentially connected, then so is $G$ .

Constructions of thin-tall Boolean spaces.

Juan Carlos Martínez (2003)

Revista Matemática Complutense

This is an expository paper about constructions of locally compact, Hausdorff, scattered spaces whose Cantor-Bendixson height has cardinality greater than their Cantor-Bendixson width.

Continuous functions on products of topological spaces

J. Gerlits (1980)

Fundamenta Mathematicae

Continuous images of Lindelöf $p$ -groups, $σ$ -compact groups, and related results

Aleksander V. Arhangel'skii (2019)

Commentationes Mathematicae Universitatis Carolinae

It is shown that there exists a $σ$ -compact topological group which cannot be represented as a continuous image of a Lindelöf $p$ -group, see Example 2.8. This result is based on an inequality for the cardinality of continuous images of Lindelöf $p$ -groups (Theorem 2.1). A closely related result is Corollary 4.4: if a space $Y$ is a continuous image of a Lindelöf $p$ -group, then there exists a covering $γ$ of $Y$ by dyadic compacta such that $| γ | \leq 2^{ω}$ . We also show that if a homogeneous compact space $Y$ is a continuous...

Convergent sequences in $β X$

Frič, Roman, Vojtáš, Peter (1984)

Proceedings of the 11th Winter School on Abstract Analysis

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