Skew-product graph of groups and their toolkits
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Open Access
Type
ThesisThesis type
Masters by ResearchAuthor/s
Yau, Chester Kwan ToAbstract
The K-theory associated with a C*-algebra plays a fundamental role in the classification and structural understanding of C*-algebras.
This thesis investigates the C*-algebras associated with graphs of groups, a rich mathematical structure first systematically developed by Bass ...
See moreThe K-theory associated with a C*-algebra plays a fundamental role in the classification and structural understanding of C*-algebras. This thesis investigates the C*-algebras associated with graphs of groups, a rich mathematical structure first systematically developed by Bass and Serre in their foundational work on group actions on trees. We adapt and extend the skew-product construction for directed graphs to the graph of groups setting. Specifically, given a cocycle labelling the edges of a graph of groups by a discrete group, a definition of skew-product graphs of groups is provided. The main theoretical contribution demonstrates that there is a natural connection between the skew-product graph of groups C*-algebra and the crossed product by the induced coaction. In addition, this definition of skew-product graphs of groups is shown to be consistent with the existing definition of skew-product graphs, in terms of the directed graph associated to graphs of groups E_G. Finally, using the existing isomorphism between graphs of groups C*-algebras and its fibred product groupoid algebra, the isomorphism between the skew-product graph of groups C*-algebra and the crossed product by the induced coaction is extended to the crossed product fibred product groupoid algebra by coaction. This thesis also includes a survey of K-theory for C*-algebras, including the K-theory of graph algebras. The last chapter also acts as a literature review of the recent developments in K-theory for both graph of groups C*-algebras and graph of groups actions on multitrees.
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See moreThe K-theory associated with a C*-algebra plays a fundamental role in the classification and structural understanding of C*-algebras. This thesis investigates the C*-algebras associated with graphs of groups, a rich mathematical structure first systematically developed by Bass and Serre in their foundational work on group actions on trees. We adapt and extend the skew-product construction for directed graphs to the graph of groups setting. Specifically, given a cocycle labelling the edges of a graph of groups by a discrete group, a definition of skew-product graphs of groups is provided. The main theoretical contribution demonstrates that there is a natural connection between the skew-product graph of groups C*-algebra and the crossed product by the induced coaction. In addition, this definition of skew-product graphs of groups is shown to be consistent with the existing definition of skew-product graphs, in terms of the directed graph associated to graphs of groups E_G. Finally, using the existing isomorphism between graphs of groups C*-algebras and its fibred product groupoid algebra, the isomorphism between the skew-product graph of groups C*-algebra and the crossed product by the induced coaction is extended to the crossed product fibred product groupoid algebra by coaction. This thesis also includes a survey of K-theory for C*-algebras, including the K-theory of graph algebras. The last chapter also acts as a literature review of the recent developments in K-theory for both graph of groups C*-algebras and graph of groups actions on multitrees.
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Date
2025Licence
The author retains copyright of this thesisRights statement
The author retains copyright of this thesis. It may only be used for the purposes of research and study. It must not be used for any other purposes and may not be transmitted or shared with others without prior permission.Faculty/School
Faculty of Science, School of Mathematics and StatisticsAwarding institution
The University of SydneyShare