Fiberwise amenability of ample \'etale groupoids

Abstract

Let G be a locally compact σ-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. We define the corresponding concepts of Flner sequences and Banach densities for 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 C*r(G) has the uniform property and thus satisfies the Toms-Winter conjecture when G is minimal second countable (topologically) amenable and almost finite in measure. Then we prove that the topological full group [[G]] is always sofic when G is second countable minimal and admits a Flner sequence. This can be used to strengthen one of Matui's result on the commutator subgroup D[[G]] when G is almost finite. Concrete examples are provided.

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