On some p-approximation properties of exact discrete groups and p uniform Roe algebras

Abstract

We study p-approximation properties of p uniform Roe algebras and their connections to coarse geometry and group theory. For a discrete metric space X with bounded geometry, we prove that property A implies p-nuclearity of the p uniform Roe algebra Bpu(X) for every p∈(1,∞), while B1u(X) is always 1-nuclear. We introduce the p-invariant translation approximation property (p-ITAP) for discrete groups, generalizing the 2-ITAP of Roe. We also introduce the p-operator ITAP. For exact groups, we show that the p-operator ITAP is equivalent to the p-approximation property of An-Lee-Ruan. We also characterize exactness of discrete groups in terms of their p uniform Roe algebras with coefficients in p-operator spaces.