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Simplicity of twisted C*-algebras of Deaconu–Renault groupoids

journal contribution
posted on 2024-11-17, 12:57 authored by Becky Armstrong, Nathan Brownlowe, Aidan Sims
We consider Deaconu–Renault groupoids associated to actions of finite-rank free abelian monoids by local homeomorphisms of locally compact Hausdorff spaces. We study simplicity of the twisted C*-algebra of such a groupoid determined by a continuous circle-valued groupoid 2-cocycle. When the groupoid is not minimal, this C*-algebra is never simple, so we focus on minimal groupoids. We describe an action of the quotient of the groupoid by the interior of its isotropy on the spectrum of the twisted C*-algebra of the interior of the isotropy. We prove that the twisted groupoid C*-algebra is simple if and only if this action is minimal. We describe applications to crossed products of topological-graph C*-algebras by quasi-free actions.

Funding

Australian Research Council (DP200100155)

History

Journal title

Journal of Noncommutative Geometry

Volume

18

Issue

1

Pagination

265-312

Language

English

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