Boundary actions of Bass-Serre Trees and the applications to C*-algebras
Abstract
In this paper, we study Bass-Serre theory from the perspectives of C*-algebras and topological dynamics. In particular, we investigate the actions of fundamental groups of graphs of groups on their Bass-Serre trees and the associated boundaries, through which we identify new families of C*-simple groups including certain tubular groups, fundamental groups of certain graphs of groups with one vertex group acylindrically hyperbolic and outer automorphism groups Out(BS(p, q)) of Baumslag-Solitar groups. In addition, we study n-dimensional Generalized Baumslag-Solitar (GBSn) groups. We first recover a result by Minasyan and Valiunas on the characterization of C*-simplicity for GBS1 groups and identify new C*-simple GBSn groups including the Leary-Minasyan group. These C*-simple groups also provide new examples of C*-selfless groups and highly transitive groups. Moreover, we demonstrate that natural boundary actions of these C*-simple fundamental groups of graphs of groups give rise to the new purely infinite crossed product C*-algebras.
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