Bivariant K-theory with R/Z-coefficients and rho classes of unitary representations

Abstract

We construct equivariant KK-theory with coefficients in R and R/Z as suitable inductive limits over II1-factors. We show that the Kasparov product, together with its usual functorial properties, extends to KK-theory with real coefficients. Let be a group. We define a -algebra A to be K-theoretically free and proper (KFP) if the group trace tr of acts as the unit element in KKR(A,A). We show that free and proper -algebras (in the sense of Kasparov) have the (KFP) property. Moreover, if is torsion free and satisfies the KK-form of the Baum-Connes conjecture, then every -algebra satisfies (KFP). If α: Un is a unitary representation and A satisfies property (KFP), we construct in a canonical way a rho class αA∈ KKR/Z1,(A,A). This construction generalizes the Atiyah-Patodi-Singer K-theory class with R/Z coefficients associated to α.