The Scarborough-Stone problem for Hausdorff spaces

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DOI10.1016/0166-8641(92)90103-7zbMath0758.54010OpenAlexW2062049674MaRDI QIDQ1203845

Peter J. Nyikos, Jerry E. Vaughan

Publication date: 18 February 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)90103-7

zbMATH Keywords

countably compact space Hausdorff spaces weak base sequentially compact spaces Scarborough-Stone problem

Mathematics Subject Classification ID

Compactness (54D30) Sequential spaces (54D55) Product spaces in general topology (54B10) Lower separation axioms ((T_0)--(T_3), etc.) (54D10) Special constructions of topological spaces (spaces of ultrafilters, etc.) (54D80)

Related Items (9)

Countably compact hyperspaces and Frolík sums ⋮ Hereditary normality of \(\gamma\mathbb{N}\)-spaces ⋮ Scattered spaces from weak diamonds ⋮ Two step iteration of almost disjoint families ⋮ Irregularity ⋮ Special ultrafilters and cofinal subsets of \(({}^\omega \omega, <^*)\) ⋮ Convergence in van der Waerden and Hindman spaces ⋮ Monads in topology ⋮ Weak regularity and consecutive topologizations and regularizations of pretopologies

Cites Work

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