Strongly base-paracompact spaces

John E. Porter

Displaying similar documents to “Strongly base-paracompact spaces”

Some versions of relative paracompactness and their absolute embeddings

Shinji Kawaguchi (2007)

Commentationes Mathematicae Universitatis Carolinae

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Arhangel’skii [Sci. Math. Jpn. 55 (2002), 153–201] defined notions of relative paracompactness in terms of locally finite open partial refinement and asked if one can generalize the notions above to the well known Michael’s criteria of paracompactness in [17] and [18]. In this paper, we consider some versions of relative paracompactness defined by locally finite (not necessarily open) partial refinement or locally finite closed partial refinement, and also consider closure-preserving...

Base-base paracompactness and subsets of the Sorgenfrey line

Strashimir G. Popvassilev (2012)

Mathematica Bohemica

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A topological space $X$ is called base-base paracompact (John E. Porter) if it has an open base $ℬ$ such that every base $ℬ^{'} \subseteq ℬ$ has a locally finite subcover $𝒞 \subseteq ℬ^{'}$ . It is not known if every paracompact space is base-base paracompact. We study subspaces of the Sorgenfrey line (e.g. the irrationals, a Bernstein set) as a possible counterexample.

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Displaying similar documents to “Strongly base-paracompact spaces”

Some versions of relative paracompactness and their absolute embeddings

Base-base paracompactness and subsets of the Sorgenfrey line

Paracompact subsets

Some generalizations of paracompactness

On nearly strongly paracompact spaces.