Closed ideals in the functionally countable subalgebra of C(X)

IF 0.6 Q3 MATHEMATICS
A. Veisi
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引用次数: 1

Abstract

In this paper, closed ideals in Cc(X), the functionally countable subalgebra of C(X), with the mc-topology, is studied. We show that ifX is CUC-space, then C*c(X) with the uniform norm-topology is a Banach algebra. Closed ideals in Cc(X) as a modified countable analogue of closed ideals in C(X) with the m-topology are characterized. For a zero-dimensional space X, we show that a proper ideal in Cc(X) is closed if and only if it is an intersection of maximal ideals of Cc(X). It is also shown that every ideal in Cc(X) with the mc-topology is closed if and only if X is a P-space if and only if every ideal in C(X) with the m-topology is closed. Moreover, for a strongly zero-dimensional space X, it is proved that a properly closed ideal in C*c(X) is an intersection of maximal ideals of C*c(X) if and only if X is pseudo compact. Finally, we show that if X is a P-space and F is an ec-filter on X, then F is an ec-ultrafilter if and only if it is a zc-ultrafilter.
C(X)的泛函可数子代数中的闭理想
本文研究了C(X)的函数可数子代数Cc(X)在mc-拓扑下的闭理想。证明了如果X是cc -空间,则具有一致范数拓扑的C* C (X)是Banach代数。将Cc(X)中的闭理想作为m拓扑下C(X)中的闭理想的修正可数类似物进行了表征。对于零维空间X,我们证明了Cc(X)中的固有理想当且仅当它是Cc(X)的极大理想的交集时是闭合的。还证明了C(X)中具有mc-拓扑的每个理想当且仅当X是p空间时是封闭的,当且仅当C(X)中具有m-拓扑的每个理想是封闭的。此外,对于强零维空间X,证明了C* C (X)中的适当闭理想是C* C (X)的极大理想的交,当且仅当X是伪紧的。最后,我们证明了如果X是p空间,F是X上的ec-滤波器,那么当且仅当F是zc-超滤波器时,F是ec-超滤波器。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
1.20
自引率
25.00%
发文量
38
审稿时长
15 weeks
期刊介绍: The international journal Applied General Topology publishes only original research papers related to the interactions between General Topology and other mathematical disciplines as well as topological results with applications to other areas of Science, and the development of topological theories of sufficiently general relevance to allow for future applications. Submissions are strictly refereed. Contributions, which should be in English, can be sent either to the appropriate member of the Editorial Board or to one of the Editors-in-Chief. All papers are reviewed in Mathematical Reviews and Zentralblatt für Mathematik.
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