Continuous images of ordered compacta are regular supercompact
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Publication:1198632
DOI10.1016/0166-8641(92)90005-KzbMath0790.54039OpenAlexW2089522223MaRDI QIDQ1198632
Jacek Nikiel, W. Bula, Edward D. Tymchatyn, H. Murat Tuncali
Publication date: 16 January 1993
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0166-8641(92)90005-k
Continuous maps (54C05) Compactness (54D30) Topological spaces with richer structures (54E99) Linearly ordered topological spaces, generalized ordered spaces, and partially ordered spaces (54F05)
Related Items (4)
Hereditarily supercompact spaces ⋮ Normally supercompact spaces and completely distributive posets ⋮ All Cluster Points of Countable Sets in Supercompact Spaces are the Limits of Nontrivial Sequences ⋮ Supercompact minus compact is super
Cites Work
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- Erratum: Orderability properties of a zero-dimensional space which is a continuous image of an ordered compactum
- On the rim-structure of continuous images of ordered compacta
- The Hahn-Mazurkiewicz theorem for hereditary locally connected continua
- Images of ordered compacta are locally peripherally metric
- Topologies on pseudo-trees and applications
- Images of arcs - a nonseparable version of the Hahn-Mazurkiewicz theorem
- Special bases for compact metrizable spaces
- "Image of a Hausdorff Arc" is Cyclically Extensible and Reducible
- Mapping arcs and dendritic spaces onto netlike continua
- Compact metric spaces have binary bases
- The Hahn-Mazurkiewicz theorem for rim-finite continua
- The Hahn-Mazurkiewicz theorem for finitely Suslinian continua
- A Simpler Proof that Compact Metric Spaces are Supercompact
- CUT POINTS IN GENERAL TOPOLOGICAL SPACES
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