Quasi-locality for \'etale groupoids
Abstract
Let G be a locally compact \'etale groupoid and L(L2(G)) be the C*-algebra of adjointable operators on the Hilbert C*-module L2(G). In this paper, we discover a notion called quasi-locality for operators in L(L2(G)), generalising the metric space case introduced by Roe. Our main result shows that when G is additionally σ-compact and amenable, an equivariant operator in L(L2(G)) belongs to the reduced groupoid C*-algebra C*r(G) if and only if it is quasi-local. This provides a practical approach to describe elements in C*r(G) using coarse geometry. Our main tool is a description for operators in L(L2(G)) via their slices with the same philosophy to the computer tomography. As applications, we recover a result by Spakula and the second-named author in the metric space case, and deduce new characterisations for reduced crossed products and uniform Roe algebras for groupoids.
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