Jonathan H. Brown, Adam H. Fuller, David R. Pitts, Sarah A. Reznikoff
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引用次数: 0
摘要
让 \(B \subseteq A\) 是 \(C^*\)- 算法的一个包含。我们研究了 B 的正则表达式和 A 的正则表达式之间的关系。我们证明了如果 \(B \subseteq A\) 是一个正则的 \(C^*\)- 包含,并且存在一个从 A 到 B 的忠实不变条件期望,那么 A 的正则表达式的网格和 B 的不变正则表达式之间存在同构。这包括证明如果 \(D \subseteq A\) 是一个 Cartan 包含,而 J 是 A 中的正则理想,那么 \(D/(J\cap D)\) 是 A/J 的 Cartan 子代数。我们对离散群的 C\(^*\)-algebra 的还原交叉积中的正则表达式进行了描述。
Regular Ideals, Ideal Intersections, and Quotients
Let \(B \subseteq A\) be an inclusion of \(C^*\)-algebras. We study the relationship between the regular ideals of B and regular ideals of A. We show that if \(B \subseteq A\) is a regular \(C^*\)-inclusion and there is a faithful invariant conditional expectation from A onto B, then there is an isomorphism between the lattice of regular ideals of A and invariant regular ideals of B. We study properties of inclusions preserved under quotients by regular ideals. This includes showing that if \(D \subseteq A\) is a Cartan inclusion and J is a regular ideal in A, then \(D/(J\cap D)\) is a Cartan subalgebra of A/J. We provide a description of regular ideals in the reduced crossed product of a C\(^*\)-algebra by a discrete group.
期刊介绍:
Integral Equations and Operator Theory (IEOT) is devoted to the publication of current research in integral equations, operator theory and related topics with emphasis on the linear aspects of the theory. The journal reports on the full scope of current developments from abstract theory to numerical methods and applications to analysis, physics, mechanics, engineering and others. The journal consists of two sections: a main section consisting of refereed papers and a second consisting of short announcements of important results, open problems, information, etc.
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