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17th "Summer" Conference on Topology and Applications
July 1-4, 2002
University of Auckland
Auckland, New Zealand

Organizers
David Gauld (University of Auckland), Sina Greenwood (University of Auckland), David McIntyre (University of Auckland), Warren Moors (Waikato University), Sidney Morris (University of South Australia), Vladimir Pestov (Victoria University Wellington), Ivan Reilly (University of Auckland), Des Robbie (University of Melbourne)

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Separation of dense subsets
by
Eva Murtinová
Charles University, Prague

A topological space is called \alpha-normal (\beta-normal) if for each pair of its closed disjoint subsets A, B there are open sets U, V such that U contains a dense subset of A, V contains a dense subset of B and U, V are disjoint (have disjoint closures, respectively). A space is alpha-regular if for every point x and a closed set F not containing x there is a neighbourhood U of x and an open set V containing a dense part of F with U, V disjoint.

There are examples showing that these properties do not coincide with each other neither with classical separation axioms.

We mention conditions for \alpha-regular spaces to be regular and show that, in a strong sense, \alpha-regularity is nonproductive.

Date received: June 20, 2002

Copyright © 2002 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Mathematical Conference Abstracts. Document # cait-56.