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Encyclopedia of Compactness Wiki*
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nearly compact をテンプレートにして作成
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*Definition [#p593dd9d]
A topological space is called nearly compact iff every [[regular open]] cover has a finite subcover.
*Property [#t352b2e2]
-[Singal-Mathur] A topological space X is nearly compact iff every open cover U of X has a finite subfamily F such that &ref(http://www.eaflux.com/imgtex/imgtex.fcgi?%5bres=100%5d%7b$%5c%7b%5cmathrm%7bint%7d%28%5cmathrm%7bcl%7d%28A%29%29:A%
*Remark [#c5edb197]
-Abbreviated to [[n-compact]].
*Reference [#p4717da1]
-J. Dontchev, M. Ganster and T. Noiri, ''On p-closed spaces'', Internat. J. Math. & Math. Sci. Vol.24, No.3 (2000) pp.203-212.
-M.K. Singal and Asha Mathur, ''On nearly-compact spaces'', Boll. Un. Mat. Ital. (4) 2(1969), 702-710.
終了行:
*Definition [#p593dd9d]
A topological space is called nearly compact iff every [[regular open]] cover has a finite subcover.
*Property [#t352b2e2]
-[Singal-Mathur] A topological space X is nearly compact iff every open cover U of X has a finite subfamily F such that &ref(http://www.eaflux.com/imgtex/imgtex.fcgi?%5bres=100%5d%7b$%5c%7b%5cmathrm%7bint%7d%28%5cmathrm%7bcl%7d%28A%29%29:A%
*Remark [#c5edb197]
-Abbreviated to [[n-compact]].
*Reference [#p4717da1]
-J. Dontchev, M. Ganster and T. Noiri, ''On p-closed spaces'', Internat. J. Math. & Math. Sci. Vol.24, No.3 (2000) pp.203-212.
-M.K. Singal and Asha Mathur, ''On nearly-compact spaces'', Boll. Un. Mat. Ital. (4) 2(1969), 702-710.
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