Summary: Let \(\mathcal G\) be a discrete group and let \(X\) be a \(\mathcal G\)-finite, proper \(\mathcal G\)-\(\mathcal{CW}\)-complex. We prove that Kasparov’s equivariant \(\mathcal K\)-homology groups \(\mathcal{KK}^G({\mathcal C}_0(X),\mathbb C)\) are isomorphic to the geometric equivariant \(\mathcal K\)-homology groups of \(X\) that are obtained by making the geometric \(\mathcal K\)-homology theory of Baum and Douglas equivariant in the natural way. This reconciles the original and current formulations of the Baum-Connes conjecture for discrete groups.
For the entire collection see [Zbl 1206.00042].