ブラウザの JavaScript がオフ(ブロックまたは許可しない)に設定されているため、このページは正常に機能しません。
Encyclopedia of Compactness Wiki*
[
ホーム
]
一覧
最終更新
バックアップ
ヘルプ
Top
>
nearly metacompact
>
複製
?
ms
nearly metacompact をテンプレートにして作成
これらのキーワードがハイライトされています:
開始行:
*Definition [#ff9ec00b]
A regular Hausdorff space X is said to be nearly metacompact provided that for each open cover C of X there is a dense set D and an open refinement R of C so that R is point finite on D.
*Reference [#n4b9100c]
-R.W. Heath and W.F. Lindgren, ''On generating non-orthocompact spaces'', Set-theoretic topology, (Papers, Inst. Medicine and Math., Ohio Univ., Athens, Ohio, 1975-1976), 225-237, Academic Press, New York, 1977.
-Hans-Peter Kunzi and Peter Fletcher, ''Some Questions Related to Almost 2-Fully Normal Spaces'', Rocky Mountain J. Math. Vol.15 (Nov. 1985).
終了行:
*Definition [#ff9ec00b]
A regular Hausdorff space X is said to be nearly metacompact provided that for each open cover C of X there is a dense set D and an open refinement R of C so that R is point finite on D.
*Reference [#n4b9100c]
-R.W. Heath and W.F. Lindgren, ''On generating non-orthocompact spaces'', Set-theoretic topology, (Papers, Inst. Medicine and Math., Ohio Univ., Athens, Ohio, 1975-1976), 225-237, Academic Press, New York, 1977.
-Hans-Peter Kunzi and Peter Fletcher, ''Some Questions Related to Almost 2-Fully Normal Spaces'', Rocky Mountain J. Math. Vol.15 (Nov. 1985).
ページ名: