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L-paracompactness and L-2-paracompactness
Journal article   Open access  Peer reviewed

L-paracompactness and L-2-paracompactness

Lutfi Kalantan
HACETTEPE JOURNAL OF MATHEMATICS AND STATISTICS, Vol.48(3), pp.779-784
01/01/2019
DOI: https://doi.org/10.15672/HJMS.2018.548

Abstract

Mathematics Physical Sciences Science & Technology Statistics & Probability
A topological space X is called L-paracompact if there exist a paracompact space Y and a bijective function f : X -> Y such that the restriction f (sic)(A) : A -> f(A) is a homeomorphism for each Lindelof subspace A subset of X. A topological space X is called L-2-paracompact if there exist a Hausdorff paracompact space Y and a bijective function f : X -> Y such that the restriction f (sic)(A): A -> f(A) is a homeomorphism for each Lindelof subspace A subset of X. We investigate these two properties.
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