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Uniformly recurrent subgroups and the ideal structure of reduced crossed products

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arxiv 1701.03413 v1 pith:XVUE3H5S submitted 2017-01-12 math.OA

Uniformly recurrent subgroups and the ideal structure of reduced crossed products

classification math.OA
keywords groupreducedcountablecrosseddiscretegammasubgroupsideal
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We study the ideal structure of reduced crossed product of topological dynamical systems of a countable discrete group. More concretely, for a compact Hausdorff space $X$ with an action of a countable discrete group $\Gamma$, we consider the absence of a non-zero ideals in the reduced crossed product $C(X) \rtimes_r \Gamma$ which has a zero intersection with $C(X)$. We characterize this condition by a property for amenable subgroups of the stabilizer subgroups of $X$ in terms of the Chabauty space of $\Gamma$. This generalizes Kennedy's algebraic characterization of the simplicity for a reduced group $\mathrm{C}^{*}$-algebra of a countable discrete group.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Uniformly recurrent subalgebras in finite von Neumann algebras

    math.OA 2026-06 unverdicted novelty 8.0

    Introduces uniformly recurrent subalgebras (URAs) and proves they characterize C*-simplicity of groups via amenable crossed products while allowing arbitrary topological complexity.

  2. Stabilizer Subgroups and the Simplicity of Reduced Crossed Products

    math.OA 2026-05 unverdicted novelty 7.0

    Simplicity of the reduced crossed product G ⋉_r C(X) for minimal actions implies a point with stabilizer of trivial amenable radical, giving characterizations for linear, hyperbolic, and related groups.