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For every Hausdorff space \(Y\) there exists a non-trivial Moore space on which all continuous functions into \(Y\) are constant - MaRDI portal

For every Hausdorff space \(Y\) there exists a non-trivial Moore space on which all continuous functions into \(Y\) are constant

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Publication:793381

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DOI10.2140/PJM.1984.111.1zbMath0538.54016OpenAlexW2055627641MaRDI QIDQ793381

Harald Brandenburg, Adam Mysior

Publication date: 1984

Published in: Pacific Journal of Mathematics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.2140/pjm.1984.111.1

zbMATH Keywords

metacompact Moore space no universal Moore space

Mathematics Subject Classification ID

Categorical methods in general topology (54B30) Moore spaces (54E30) Embedding (54C25)

Related Items (4)

On regular separable countably compact \(\mathbb{R}\)-rigid spaces ⋮ Some open categorical problems in Top ⋮ On regular \(\kappa\)-bounded spaces admitting only constant continuous mappings into \(T_1\) spaces of pseudocharacter \(\le\kappa\) ⋮ Embedding topological spaces into Hausdorff \(\kappa\)-bounded spaces

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