English

Fiberwise amenability of ample \'{e}tale groupoids

Operator Algebras 2021-10-25 v1 Dynamical Systems Group Theory

Abstract

Let G\mathcal{G} be a locally compact σ\sigma-compact Hausdorff ample groupoid on a compact space. In this paper, we further examine the (ubiquitous) fiberwise amenability introduced by the author and Jianchao Wu for G\mathcal{G}. We define the corresponding concepts of F{\o}lner sequences and Banach densities for G\mathcal{G}, based on which, we establish a topological groupoid version of the Ornstein-Weiss quasi-tilling theorem. This leads to the notion of almost finiteness in measure for ample groupoids as a weaker version of Matui's almost finiteness. As applications, we first show that Cr(G)C^*_r(\mathcal{G}) has the uniform property Γ\Gamma and thus satisfies the Toms-Winter conjecture when G\mathcal{G} is minimal second countable (topologically) amenable and almost finite in measure. Then we prove that the topological full group [[G]][[\mathcal{G}]] is always sofic when G\mathcal{G} is second countable minimal and admits a F{\o}lner sequence. This can be used to strengthen one of Matui's result on the commutator subgroup D[[G]]D[[\mathcal{G}]] when G\mathcal{G} is almost finite. Concrete examples are provided.

Keywords

Cite

@article{arxiv.2110.11548,
  title  = {Fiberwise amenability of ample \'{e}tale groupoids},
  author = {Xin Ma},
  journal= {arXiv preprint arXiv:2110.11548},
  year   = {2021}
}

Comments

33 pages

R2 v1 2026-06-24T07:05:40.206Z