Boundary C^*-algebras for acylindrical groups
classification
🧮 math.OA
math.GR
keywords
deltagammaacylindricalalgebraboundaryalgebrascuntz-kriegerdetermined
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Let $\Delta$ be an infinite, locally finite tree with more than two ends. Let $\Gamma<\aut(\Delta)$ be an acylindrical uniform lattice. Then the boundary algebra $\cl A_\Gamma = C(\partial\Delta)\rtimes \Gamma$ is a simple Cuntz-Krieger algebra whose K-theory is determined explicitly.
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