Polynomial growth and property RDp for \'etale groupoids with applications to K-theory
Abstract
We investigate property RDp for \'etale groupoids and apply it to K-theory of reduced groupoid Lp-operator algebras. In particular, under the assumption of polynomial growth, we show that the K-theory groups for a reduced groupoid Lp-operator algebra are independent of p∈ (1, ∞). We apply the results to coarse groupoids and graph groupoids.
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