Formal Verlinde Module

Abstract

Let G be a compact, simple and simply connected Lie group and be an equivariant Dixmier-Douady bundle over G. For any fixed level k, we can define a G-C*-algebra Ck+h(G) as all the continuous sections of the tensor power k+h vanishing at infinity. A deep theorem by Freed-Hopkins-Teleman showed that the twisted K-homology KKG(Ck+h(G), ) is isomorphic to the level k Verlinde ring Rk(G). By the construction of crossed product, we define a C*-algebra C*(G,Ck+h(G)). We show that the K-homology KK(C*(G,Ck+h(G)),) is isomorphic to the formal Verlinde module R-∞(G) R(G) Rk(G), where R-∞(G) = Hom(R(G),) is the completion of the representation ring.