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We will show that under ${M A}_{c o u n t a b l e}$ for each $k \in ℕ$ there exists a group whose $k$ -th power is countably compact but whose $2^{k}$ -th power is not countably compact. In particular, for each $k \in ℕ$ there exists $l \in [k, 2^{k})$ and a group whose $l$ -th power is countably compact but the $l + 1$ -st power is not countably compact.

On Frolík’s characterization of class $P$

Jerry E. Vaughan (1994)

Czechoslovak Mathematical Journal

On function spaces of compact subspaces of Σ-products of the real line

K. Alster, Roman Pol (1980)

Fundamenta Mathematicae

On inhomogeneity of products of compact F-spaces

Ryszard Frankiewicz, Kenneth Kunen, Paweł Zbierski (1988)

Fundamenta Mathematicae

On lexicographic products

A. J. Ostaszewski (1974)

Colloquium Mathematicae

On locales whose countably compact sublocales have compact closure

Themba Dube (2023)

Mathematica Bohemica

Among completely regular locales, we characterize those that have the feature described in the title. They are, of course, localic analogues of what are called $cl$ -isocompact spaces. They have been considered in T. Dube, I. Naidoo, C. N. Ncube (2014), so here we give new characterizations that do not appear in this reference.

On maps preserving connectedness and/or compactness

István Juhász, Jan van Mill (2018)

Commentationes Mathematicae Universitatis Carolinae

We call a function $f : X \to Y$ P-preserving if, for every subspace $A \subset X$ with property P, its image $f (A)$ also has property P. Of course, all continuous maps are both compactness- and connectedness-preserving and the natural question about when the converse of this holds, i.e. under what conditions such a map is continuous, has a long history. Our main result is that any nontrivial product function, i.e. one having at least two nonconstant factors, that has connected domain, $T_{1}$ range, and is connectedness-preserving...

On metric products

Irmina Herburt, Maria Moszyńska (1991)

Colloquium Mathematicae

On metrization of the uniformity of a product of metric spaces

Ján Borsík, Jozef Doboš (1982)

Mathematica Slovaca

On Michael's problem concerning the Lindelöf property in the Cartesian products

K. Alster (1984)

Fundamenta Mathematicae

On movability and other similar shape properties

Juliusz Olędzki (1975)

Fundamenta Mathematicae

On multisequences and their application to products of sequential spaces

Saliou Sitou (1999)

Mathematica Slovaca

On N. Noble's theorems concerning powers of spaces and mappings

L. Polkowski (1979)

Colloquium Mathematicae

On $n$ -thin dense sets in powers of topological spaces

Adam Bartoš (2016)

Commentationes Mathematicae Universitatis Carolinae

A subset of a product of topological spaces is called $n$ -thin if every its two distinct points differ in at least $n$ coordinates. We generalize a construction of Gruenhage, Natkaniec, and Piotrowski, and obtain, under CH, a countable $T_{3}$ space $X$ without isolated points such that $X^{n}$ contains an $n$ -thin dense subset, but $X^{n + 1}$ does not contain any $n$ -thin dense subset. We also observe that part of the construction can be carried out under MA.

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