Every metric space of weight \(\lambda = \lambda^{\aleph_0}\) admits a condensation onto a Banach space
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Publication:2697408
DOI10.1016/J.TOPOL.2023.108486OpenAlexW4324135555WikidataQ121617895 ScholiaQ121617895MaRDI QIDQ2697408
Evgeny G. Pytkeev, Alexander V. Osipov
Publication date: 12 April 2023
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2202.04576
Special maps on topological spaces (open, closed, perfect, etc.) (54C10) Topological spaces with richer structures (54E99) Topology of topological vector spaces (57N17) Topology of infinite-dimensional manifolds (57N20)
Cites Work
- Einbettung metrischer Räume
- Hereditarily plumed spaces
- Upper bounds of topologies
- On a problem of ``Scottish Book concerning condensations of metric spaces onto compacta
- On classes of subcompact spaces
- Compact condensations of Hausdorff spaces
- Some properties of subcompact spaces
- Solution of Ponomarev's problem of condensation onto compact sets
- Compact condensations and compactifications
- Spaces with compact subtopologies
- On the properties of subclasses of weakly dyadic compact spaces
- Cardinals of closed sets
- Characterizing Hilbert space topology
- Some recent advances and open problems in general topology
- On condensations of $C_{p}$-spaces onto compacta
- Уплотнения на бикомпакты и связь с бикомпактными расширениями и с ретракцией
- On mapping of countable spaces
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