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The Wallman Spaces and Compactifications

If X is a topological space and Y is a ring of closed sets, then a necessary and sufficient condition for the Wallman space W(X,F) to be a compactification of X is that X be T1 andYF separating. A necessary and sufficient condition for a Wallman compactification to be Hausdoff is that F be a normal base. As a result, not all T, compactifications can be of Wallman type. One point and finite Hausdorff compactifications are of Wallman type.

Identiferoai:union.ndltd.org:unt.edu/info:ark/67531/metadc504392
Date12 1900
CreatorsLiu, Wei-kong
ContributorsMohat, John T., 1924-, Allen, John Ed, 1937-
PublisherNorth Texas State University
Source SetsUniversity of North Texas
LanguageEnglish
Detected LanguageEnglish
TypeThesis or Dissertation
Formatiii, 30 leaves, Text
RightsPublic, Liu, Wei-kong, Copyright, Copyright is held by the author, unless otherwise noted. All rights reserved.

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