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The Furstenberg Boundary of a Groupoid (1904.10062v2)

Published 22 Apr 2019 in math.OA

Abstract: We define the Furstenberg boundary of a locally compact Hausdorff \'etale groupoid, generalising the Furstenberg boundary for discrete groups, by providing a construction of a groupoid-equivariant injective envelope. Using this injective envelope, we establish the absence of recurrent amenable subgroups in the isotropy as a sufficient criterion for the intersection property of a locally compact Hausdorff \'etale groupoid with compact unit space and no fixed points. This yields a criterion for C*-simplicity of minimal groupoids.