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On Expanding Locally Finite Collections

Published online by Cambridge University Press:  20 November 2018

Lawrence L. Krajewski
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A space X is in-expandable, where m is an infinite cardinal, if for every locally finite collection {Hα| αA} of subsets of X with |A| ≦ m(cardinality of Am) there exists a locally finite collection of open subsets {Gα| αA} such that HαGα for every αA. X is expandable if it is m-expandable for every cardinal m. The notion of expandability is closely related to that of collection wise normality introduced by Bing [1], X is collectionwise normal if for every discrete collection of subsets {Hα|αA} there is a discrete collection of open subsets {Gα|αA} such that HαGα for every αA. Expandable spaces share many of the properties possessed by collectionwise normal spaces. For example, an expandable developable space is metrizable and an expandable metacompact space is paracompact.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 23 , Issue 1 , February 1971 , pp. 58 - 68
Copyright
Copyright © Canadian Mathematical Society 1971

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