C-Tychonoff and L-Tychonoff Topological Spaces

C-Tychonoff and L-Tychonoff Topological Spaces

A topological space X is called C-Tychonoff if there exist a one-to-one function f from X onto a Tychonoff space Y such that f restriction K from K onto f(K) is a homeomorphism for each compact subspace K of X. We discuss this property and illustrate the relationships between C-Tychonoffness and som...

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Veröffentlicht in:European journal of pure and applied mathematics 2018-07, Vol.11 (3), p.882-892
1. Verfasser: ALZahrani, Samirah
Format: Artikel
Sprache:eng
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Zusammenfassung:A topological space X is called C-Tychonoff if there exist a one-to-one function f from X onto a Tychonoff space Y such that f restriction K from K onto f(K) is a homeomorphism for each compact subspace K of X. We discuss this property and illustrate the relationships between C-Tychonoffness and some other properties like submetrizability, local compactness, L-Tychononess, C-normality, C-regularity, epinormality, sigma-compactness, pseudocompactness and zero-dimensional.
ISSN:1307-5543
1307-5543
DOI:10.29020/nybg.ejpam.v11i3.3253