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Encyclopedia of Compactness Wiki*
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semi-metacompact をテンプレートにして作成
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*Definition [#o0121bd2]
A regular Hausdorff space X is said to be semi-metacompact provided that every open cover C of X has an open refinement R so that no non-empty open subset of X is a subset of infinitely many members of R.
*Reference [#d63e6343]
-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 [#o0121bd2]
A regular Hausdorff space X is said to be semi-metacompact provided that every open cover C of X has an open refinement R so that no non-empty open subset of X is a subset of infinitely many members of R.
*Reference [#d63e6343]
-Hans-Peter Kunzi and Peter Fletcher, ''Some Questions Related to Almost 2-Fully Normal Spaces'', Rocky Mountain J. Math. Vol.15 (Nov. 1985).
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