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Separating Closed Sets by Continuous Mappings into Developable Spaces

Published online by Cambridge University Press:  20 November 2018

Harald Brandenburg*
Affiliation:
Freie Universität Berlin, Berlin, Federal Republic of Germany
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A topological space X is called developable if it has a development, i.e., a sequence of open covers of X such that for each xX the collection is a neighbourhood base of x, where

This class of spaces has turned out to be one of the most natural and useful generalizations of metrizable spaces [23]. In [4] it was shown that some well known results in metrization theory have counterparts in the theory of developable spaces (i.e., Urysohn's metrization theorem, the Nagata-Smirnov theorem, and Nagata's “double sequence theorem”). Moreover, in [3] it was pointed out that subspaces of products of developable spaces (i.e., D-completely regular spaces) can be characterized in much the same way as subspaces of products of metrizable spaces (i.e., completely regular T1-spaces).

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1981

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