Equivariant K-theory and the Chern character for discrete groups

Abstract

Let X be a compact Hausdorff space, let be a discrete group that acts continuously on X from the right, define X = \(x,γ) ∈ X × : x·γ= x\, and let act on X via the formula (x,γ)·α = (x·α, α-1γα). Results of P. Baum and A. Connes, along with facts about the Chern character, imply that Ki(X) C Ki(X) C for i = 0, -1. In this note, we present an example where the groups Ki(X) and Ki(X) are not isomorphic.