A Direct Proof that a Linearly Ordered Space is Hereditarily Collectionwise Normal
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Publication:5584475
DOI10.2307/2037311zbMath0189.53103OpenAlexW4236943784MaRDI QIDQ5584475
Publication date: 1970
Full work available at URL: https://doi.org/10.2307/2037311
Linearly ordered topological spaces, generalized ordered spaces, and partially ordered spaces (54F05) Higher separation axioms (completely regular, normal, perfectly or collectionwise normal, etc.) (54D15)
Related Items (8)
Sums, products, and mappings of weakly pseudocompact spaces ⋮ A Note on Point-Countability in Linearly Ordered Spaces ⋮ On modal logics arising from scattered locally compact Hausdorff spaces ⋮ Stationary subspaces in ordered spaces ⋮ A simple proof that a linearly ordered space is hereditarily and completely collectionwise normal ⋮ Monotonically Normal Spaces ⋮ Bounded Subsets of Tychonoff Spaces: A Survey of Results and Problems ⋮ Covering versus partitioning with the Cantor space
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