| Riesz空间中的极大不相交系和表示理论 |
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| 引用本文: | 熊洪允,荣喜民.Riesz空间中的极大不相交系和表示理论[J].数学学报,1998,41(4):763-766. |
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| 作者姓名: | 熊洪允 荣喜民 |
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| 作者单位: | 天津大学数学系 |
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| 摘 要: | 设E是阿基米德Riesz空间,有弱单位元e和极大不相交系{ei:i∈I},其中每一个ei都是投影元素.由ei生成的主带记为B(ei).本文考虑如下论述:(a)存在完全正则Hausdorf空间X,使E是Riesz同构于C(X);(b)对每一个i∈I,存在一个完全正则Hausdorf空间Xi使B(ei)是Riesz同构于C(Xi).我们证明(a)可推出(b).但其逆在一般情况下不成立.当(b)成立时,我们得到一些与(a)等价的论述.
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| 关 键 词: | 弱单位元,极大不相交系,投影元素,Riesz同态,Gelfand映射 |
Maximal Disjoint Systems in Riesz Spaces and Representation Theory |
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| Xiong Hongyun,Rong Ximin.Maximal Disjoint Systems in Riesz Spaces and Representation Theory[J].Acta Mathematica Sinica,1998,41(4):763-766. |
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| Authors: | Xiong Hongyun Rong Ximin |
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| Abstract: | Let E be an Archimedean Riesz space possessing a weak unit e and a maximal disjoint system {e i :i∈ I} in which each e i is a projection element. The principal band generated by e i is denoted by B(e i). In this paper, consider the following statements: (a) there exists a completely regular Hausdorff space X such that E is Riesz isomorphic to C(X). (b) For every i∈ I there exists a completely regular Hausdorff space X i such that B(e i) is Riesz isomorphic to C(X i). We show that (a) implies (b). But the inverse is not true in general. Whenever (b) holds, we obtain some statements, each of which is equivalent to (a). |
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| Keywords: | Weak unit Maximal disjoint system Projection element Riesz homomorphism Gelfand mapping |
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