Incomparable compactifications of the ray with Peano continuum as remainder
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Publication:290621
DOI10.1016/J.TOPOL.2016.05.008zbMath1341.54017OpenAlexW2403651637MaRDI QIDQ290621
Benjamin Vejnar, Pavel Pyrih, Radek Marciňa, Adam Bartoš
Publication date: 3 June 2016
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.topol.2016.05.008
Continua and generalizations (54F15) Extensions of spaces (compactifications, supercompactifications, completions, etc.) (54D35) Remainders in general topology (54D40) Real-valued functions in general topology (54C30)
Related Items (2)
There is no compact metrizable space containing all continua as unique components ⋮ Compactifiable classes of compacta
Cites Work
- \(2^{{\aleph}_0}\) ways of approaching a continuum with \([1,\infty)\)
- An uncountable family of metric compactifications of the ray with remainder pseudo-arc.
- Uncountable families of metric compactifications of the ray
- Waraszkiewicz spirals revisited
- An Uncountable Collection of Mutually Incomparable Chainable Continua
- An Uncountable Collection of Chainable Continua
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