International Journal of Mathematics and Mathematical Sciences (Jan 1993)

A new ordered compactification

  • D. C. Kent,
  • T. A. Richmond

DOI
https://doi.org/10.1155/S0161171293000146
Journal volume & issue
Vol. 16, no. 1
pp. 117 – 124

Abstract

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A new Wallman-type ordered compactification γ∘X is constructed using maximal CZ-filters (which have filter bases obtained from increasing and decreasing zero sets) as the underlying set. A necessary and sufficient condition is given for γ∘X to coincide with the Nachbin compactification β∘X; in particular γ∘X=β∘X whenever X has the discrete order. The Wallman ordered compactification ω∘X equals γ∘X whenever X is a subspace of Rn. It is shown that γ∘X is always T1, but can fail to be T1-ordered or T2.

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