Strength of convergence in the orbit space of a groupoid
Abstract
Let G be a second-countable locally-compact Hausdorff groupoid with a Haar system, and let xn be a sequence in the unit space of G. We show that the notions of strength of convergence of xn in the orbit space and measure-theoretic accumulation along the orbits are equivalent ways of realising multiplicity numbers associated to a sequence of induced representation of the groupoid C*-algebra.
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