Invariant measures and traces on groupoid C-algebras
Abstract
We provide sufficient conditions for the existence of a trace on the essential C-algebra of a (not necessarily Hausdorff) \'etale groupoid G which extends an invariant measure μ on the unit space of G. In particular, it suffices for the isotropy groups of G to be amenable, or for G to be essentially free with respect to μ. We also show that G is essentially free with respect to an invariant measure μ if and only if μ extends to a unique trace on the full C-algebra of G. We work in the generality of possibly infinite measures and, accordingly, possibly unbounded traces. Moreover, whenever possible, we state our results for twisted groupoids. As an application, we show that gauge-invariant algebras of finite-state self-similar groups admit a unique tracial state.
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