Strict comparison holds in the uniform Roe algebra of a discrete amenable group

Abstract

Let Γ be a countable discrete amenable group, and let A=l∞(Γ) Γ. It is shown that if a, b ∈ A K are positive elements such that dτ(a) < dτ(b), τ∈ T(A), then a is Cuntz subequivalent to b. Moreover, consider the universal minimal set (M, Γ). The simple C*-algebra C(M)Γ is shown to be AH in the strong sense that there is an increasing net of unital sub-C*-algebras Aλ⊂eq A, λ∈ Λ, such that each Aλ is a simple (separable) Z-absorbing approximately homogeneous C*-algebra with real rank zero and A = λ∈ Λ Aλ. In particular, C(M)Γ is approximately divisible.