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<p><P>Let C(X) be the ring of all continuous real valued functions defined on a completely regular T1-space. Let CK(X) be the ideal of functions with compact support. Purity of CK(X) is studied and characterized through the subspace XL, the set of all points in X with compact neighborhoods (nbhd). It is proved that CK(X) is pure if and only if XL=∪f∈CK supp f. if CK(X) and CK(Y) are pure ideals, then CK(X) is isomorphic to CK(Y) if and only if XL is homeomorphic to YL. It is proved that CK(X) is pure and XL is basically disconnected if and only if for every f ∈CK(X), the ideal (f ) is a projective C(X)-module. Finally it is proved that if CK(X) is pure, then XL is an F'-space if and only if every principal ideal of CK(X) is a flat C(X)-module. Concrete examples exemplifying the concepts studied are given.</p>
収録刊行物
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- Mathematical Journal of Okayama University
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Mathematical Journal of Okayama University 41 (1), 111-120, 1999-01
Department of Mathematics, Faculty of Science, Okayama University
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詳細情報 詳細情報について
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- CRID
- 1390572174578385536
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- NII論文ID
- 120002309306
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- NII書誌ID
- AA00723502
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- ISSN
- 00301566
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- 本文言語コード
- en
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- データソース種別
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- JaLC
- IRDB
- CiNii Articles
