Some versions of relative paracompactness and their absolute embeddings

Shinji Kawaguchi

Commentationes Mathematicae Universitatis Carolinae (2007)

  • Volume: 48, Issue: 1, page 147-166
  • ISSN: 0010-2628

Abstract

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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 cases, such as 1 -lf-, 1 -cp-, α -lf, α -cp-paracompactness and so on. Moreover, on their absolute embeddings, we have the following results. Theorem 1. A Tychonoff space Y is 1 -lf- (or equivalently, 1 -cp-) paracompact in every larger Tychonoff space if and only if Y is Lindelöf. Theorem 2. A Tychonoff space Y is α -lf- (or equivalently, α -cp-) paracompact in every larger Tychonoff space if and only if Y is compact. We also show that in Theorem 1, “every larger Tychonoff space” can be replaced by “every larger Tychonoff space containing Y as a closed subspace”. But, this replacement is not available for Theorem 2.

How to cite

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Kawaguchi, Shinji. "Some versions of relative paracompactness and their absolute embeddings." Commentationes Mathematicae Universitatis Carolinae 48.1 (2007): 147-166. <http://eudml.org/doc/250210>.

@article{Kawaguchi2007,
abstract = {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 cases, such as $1$-lf-, $1$-cp-, $\alpha $-lf, $\alpha $-cp-paracompactness and so on. Moreover, on their absolute embeddings, we have the following results. Theorem 1. A Tychonoff space $Y$ is $1$-lf- (or equivalently, $1$-cp-) paracompact in every larger Tychonoff space if and only if $Y$ is Lindelöf. Theorem 2. A Tychonoff space $Y$ is $\alpha $-lf- (or equivalently, $\alpha $-cp-) paracompact in every larger Tychonoff space if and only if $Y$ is compact. We also show that in Theorem 1, “every larger Tychonoff space” can be replaced by “every larger Tychonoff space containing $Y$ as a closed subspace”. But, this replacement is not available for Theorem 2.},
author = {Kawaguchi, Shinji},
journal = {Commentationes Mathematicae Universitatis Carolinae},
keywords = {$1$-paracompactness of $Y$ in $X$; $2$-paracompactness of $Y$ in $X$; Aull-para-compactness of $Y$ in $X$; $\alpha $-paracompactness of $Y$ in $X$; $1$-lf-paracompactness of $Y$ in $X$; $2$-lf-paracompactness of $Y$ in $X$; Aull-lf-paracompactness of $Y$ in $X$; $\alpha $-lf-paracompactness of $Y$ in $X$; $1$-cp-paracompactness of $Y$ in $X$; $2$-cp-paracompactness of $Y$ in $X$; Aull-cp-paracompactness of $Y$ in $X$; $\alpha $-cp-paracompactness of $Y$ in $X$; absolute embedding; compact; Lindelöf; 1-paracompactness of in ; 2-paracompactness of in ; -paracompactness of in },
language = {eng},
number = {1},
pages = {147-166},
publisher = {Charles University in Prague, Faculty of Mathematics and Physics},
title = {Some versions of relative paracompactness and their absolute embeddings},
url = {http://eudml.org/doc/250210},
volume = {48},
year = {2007},
}

TY - JOUR
AU - Kawaguchi, Shinji
TI - Some versions of relative paracompactness and their absolute embeddings
JO - Commentationes Mathematicae Universitatis Carolinae
PY - 2007
PB - Charles University in Prague, Faculty of Mathematics and Physics
VL - 48
IS - 1
SP - 147
EP - 166
AB - 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 cases, such as $1$-lf-, $1$-cp-, $\alpha $-lf, $\alpha $-cp-paracompactness and so on. Moreover, on their absolute embeddings, we have the following results. Theorem 1. A Tychonoff space $Y$ is $1$-lf- (or equivalently, $1$-cp-) paracompact in every larger Tychonoff space if and only if $Y$ is Lindelöf. Theorem 2. A Tychonoff space $Y$ is $\alpha $-lf- (or equivalently, $\alpha $-cp-) paracompact in every larger Tychonoff space if and only if $Y$ is compact. We also show that in Theorem 1, “every larger Tychonoff space” can be replaced by “every larger Tychonoff space containing $Y$ as a closed subspace”. But, this replacement is not available for Theorem 2.
LA - eng
KW - $1$-paracompactness of $Y$ in $X$; $2$-paracompactness of $Y$ in $X$; Aull-para-compactness of $Y$ in $X$; $\alpha $-paracompactness of $Y$ in $X$; $1$-lf-paracompactness of $Y$ in $X$; $2$-lf-paracompactness of $Y$ in $X$; Aull-lf-paracompactness of $Y$ in $X$; $\alpha $-lf-paracompactness of $Y$ in $X$; $1$-cp-paracompactness of $Y$ in $X$; $2$-cp-paracompactness of $Y$ in $X$; Aull-cp-paracompactness of $Y$ in $X$; $\alpha $-cp-paracompactness of $Y$ in $X$; absolute embedding; compact; Lindelöf; 1-paracompactness of in ; 2-paracompactness of in ; -paracompactness of in
UR - http://eudml.org/doc/250210
ER -

References

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