Original Articles

SPACES WITH WALLMAN EQUIVALENT INTERMEDIATE SPACES

Published in: Quaestiones Mathematicae
Volume 16 , issue 2 , 1993 , pages: 171–175

DOI: 10.1080/16073606.1993.9631728

Author(s): Cuebas Laura Department of Mathematics, , DarrellW. Hajek Department of Mathematics,

Keywords: 54D30 , 54D35

Abstract

If every infinite closed subset of the Wallman compactification, WX, of a space X must contain at least one element of X, then for any space Y intermediate between X and WX the Wallman compactification WY is homeomorphic to WX. This extends a property which characterizes normality inducing spaces. In the case where X is not normal, however, this is not a characterization, since there are nonnormal spaces for which all intermediate spaces are Wallman equivalent, but have infinite closed subsets contained in WX/X.

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