Abstract
In this paper, a characterization is given for compact door spaces. We, also, deal with spaces X such that a compactification K(X) of X is submaximal or door. Let X be a topological space and K(X) be a compactification of X. We prove, here, that K(X) is submaximal if and only if for each dense subset D of X, the following properties hold:. (i)D is co-finite in K(X);(ii)for each xK(X)\D, {x} is closed. If X is a noncompact space, then we show that K(X) is a door space if and only if X is a discrete space and K(X) is the one-point compactification of X.
| Original language | English |
|---|---|
| Pages (from-to) | 1969-1975 |
| Number of pages | 7 |
| Journal | Topology and its Applications |
| Volume | 158 |
| Issue number | 15 |
| DOIs | |
| State | Published - 15 Sep 2011 |
Keywords
- Door space
- Primary
- Secondary
- Submaximal space Wallman compactification
- T-compactification
ASJC Scopus subject areas
- Geometry and Topology