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angelic compact
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angelic compact 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 [#n636131a]
-Let K be a compact Hausdorff space. K is an angelic compact (also called a compact Frechet space) iff the closure of every subset A is the set of limits of sequences from A.
*Property [#d7090fd5]
-Every compact metric space is both [[Eberlein compact]] and [[Rosenthal compact]], and each of these is angelic.
-If K is an [[Eberlein compact]] and L is a [[Rosenthal compact]], then K×L is angelic.
*Reference [#y90c3dac]
-Edgar, G. A. and Wheeler, R. F. , ''Topological properties of Banach spaces'', Pacific J. Math. 115 (1984), no. 2, 317--350.
終了行:
*Definition [#n636131a]
-Let K be a compact Hausdorff space. K is an angelic compact (also called a compact Frechet space) iff the closure of every subset A is the set of limits of sequences from A.
*Property [#d7090fd5]
-Every compact metric space is both [[Eberlein compact]] and [[Rosenthal compact]], and each of these is angelic.
-If K is an [[Eberlein compact]] and L is a [[Rosenthal compact]], then K×L is angelic.
*Reference [#y90c3dac]
-Edgar, G. A. and Wheeler, R. F. , ''Topological properties of Banach spaces'', Pacific J. Math. 115 (1984), no. 2, 317--350.
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