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Title
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An isomorphism of the Wallman and Cech-Stone compactifications
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Author
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Abstract
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| For a metrizable topological space X it is well known that in general the Cech-Stone compactification beta(X) or the Wallman compactification W(X) are not metrizable. To remedy this fact one can alternatively associate a point-set distance to the metric, a so called approach distance. It is known that in this setting both a Cech-Stone compactification beta*(X) and a Wallman compactification W*(X) can be constructed in such a way that their approach distances induce the original approach distance of the metric on X [23], [24]. The main goal in this paper is to formulate necessary and su fficient conditions for an approach space X such that the Cech-Stone compactification beta*(X) and the Wallman compactification W*(X) are isomorphic, thus answering a question first raised in [24]. The first clue to reach this goal is to settle a question left open in [11], to formulate su fficient conditions for a compact approach space to be normal. In particular the result shows that the Cech-Stone compactification beta*(X) of a uniform T (2) space, is always normal. We prove that the Wallman compactification W*(X) is normal if and only if X is normal, and we produce an example showing that, unlike for topological spaces, in the approach setting normality of X is not su fficient for beta*(X) and W*(X) to be isomorphic. We introduce a strengthening of the regularity condition on X, which we call ideal-regularity, and in our main theorem we conclude that X is ideal-regular, normal and T (1) if and only if X is a uniform T (1) approach space with beta*(X) and W*(X) isomorphic. Classical topological results are recovered and implications for (quasi-)metric spaces are investigated. |
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Language
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English
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Source (journal)
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Quaestiones mathematicae. - Pretoria
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Publication
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Grahamstown
:
Natl inquiry services centre pty ltd
,
2022
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ISSN
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0379-9468
1607-3606
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DOI
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10.2989/16073606.2021.1891991
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Volume/pages
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45
:5
(2022)
, p. 733-763
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ISI
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000628038000001
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Full text (Publisher's DOI)
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Full text (open access)
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