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In the set of compactifications of X we consider the partial pre-order defined by (W, h) ≤X (Z, g) if there is a continuous function f : Z ⇢ W, such that (f ∘ g)(x) = h(x) for every x ∈ X. Two elements (W, h) and (Z, g) of K(X) are equivalent, (W, h) ≡X (Z, g), if there is a homeomorphism h : W ! Z such that (f ∘ g)(x) = h(x) for every x ∈ X. We denote by K(X) the upper semilattice of classes of equivalence of compactifications of X defined by ≤X and ≡X. We analyze in this article K(Cp(X, Y)) where...

The Rothberger property on $C_{p} (Ψ (𝒜), 2)$

Daniel Bernal-Santos (2016)

Commentationes Mathematicae Universitatis Carolinae

A space $X$ is said to have the Rothberger property (or simply $X$ is Rothberger) if for every sequence $〈 𝒰_{n} : n \in ω 〉$ of open covers of $X$ , there exists $U_{n} \in 𝒰_{n}$ for each $n \in ω$ such that $X = ⋃_{n \in ω} U_{n}$ . For any $n \in ω$ , necessary and sufficient conditions are obtained for $C_{p} {(Ψ (𝒜), 2)}^{n}$ to have the Rothberger property when $𝒜$ is a Mrówka mad family and, assuming CH (the Continuum Hypothesis), we prove the existence of a maximal almost disjoint family $𝒜$ for which the space $C_{p} {(Ψ (𝒜), 2)}^{n}$ is Rothberger for all $n \in ω$ .

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 $p \in ℕ^{*}$ .

The Tensor Product of Continuous Lattices.

Hans-J. Bandelt (1980)

Mathematische Zeitschrift

The $σ$ -property in $C (X)$

Anthony W. Hager (2016)

Commentationes Mathematicae Universitatis Carolinae

The $σ$ -property of a Riesz space (real vector lattice) $B$ is: For each sequence ${b_{n}}$ of positive elements of $B$ , there is a sequence ${λ_{n}}$ of positive reals, and $b \in B$ , with $λ_{n} b_{n} \leq b$ for each $n$ . This condition is involved in studies in Riesz spaces of abstract Egoroff-type theorems, and of the countable lifting property. Here, we examine when “ $σ$ ” obtains for a Riesz space of continuous real-valued functions $C (X)$ . A basic result is: For discrete $X$ , $C (X)$ has $σ$ iff the cardinal $| X | < 𝔟$ , Rothberger’s bounding number. Consequences and...

Topological Continuous Convergence.

Friedhelm Schwarz (1984/1985)

Manuscripta mathematica

Topologies between compact and uniform convergence on function spaces.

Kundu, S., McCoy, R.A. (1993)

International Journal of Mathematics and Mathematical Sciences

Two classes of locally compact sober spaces.

Belaid, Karim, Echi, Othman, Gargouri, Riyadh (2005)

International Journal of Mathematics and Mathematical Sciences

Über die Erzeugung von eigentlichen Transformationsgruppen.

Herbert Abels (1968)

Mathematische Zeitschrift

Unified spaces and singular sets for mappings of locally compact spaces

R. F. Dickamn, Jr. (1968)

Fundamenta Mathematicae

Vietoris topology on spaces dominated by second countable ones

Carlos Islas, Daniel Jardon (2015)

Open Mathematics

For a given space X let C(X) be the family of all compact subsets of X. A space X is dominated by a space M if X has an M-ordered compact cover, this means that there exists a family F = FK : K ∈ C(M) ⊂ C(X) such that ∪ F = X and K ⊂ L implies that FK ⊂ FL for any K;L ∈ C(M). A space X is strongly dominated by a space M if there exists an M-ordered compact cover F such that for any compact K ⊂ X there is F ∈ F such that K ⊂ F . Let K(X) D C(X){Øbe the set of all nonempty compact subsets of a space...

$θ$ -regular spaces.

Janković, Dragan S. (1985)

International Journal of Mathematics and Mathematical Sciences

О связях между понятиями компактности, линейной компактности и наследственно линейной компактности в топологических кольцах

М.И. Урсул (1979)

Matematiceskie issledovanija

Об изоморфизме групп когомологий локально компактного пространства и групп расширений модулей

В.К. Захаров (1974)

Sibirskij matematiceskij zurnal

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