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Riesz空间中的极大不相交系和表示理论
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
作者姓名:熊洪允 荣喜民
作者单位:天津大学数学系
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.

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
Xiong Hongyun Rong Ximin. Maximal Disjoint Systems in Riesz Spaces and Representation Theory[J]. Acta Mathematica Sinica, 1998, 41(4): 763-766
Authors:Xiong Hongyun Rong Ximin
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).
Keywords:Weak unit   Maximal disjoint system  Projection element   Riesz homomorphism   Gelfand mapping
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