Naturality of FHT isomorphism

Abstract

Freed, Hopkins and Teleman constructed an isomorphism between twisted equivariant K-theory of compact Lie group G and the "Verlinde ring" of the loop group of G. We call this isomorphism FHT isomorphism. However, it does not hold naturality with respect to group homomorphisms. We construct two "quasi functors" t.e.K (a modification of twisted equivariant K-theory) and RL (a modification of representation group of loop groups) so that FHT isomorphism is natural transformation between two "quasi functors" for tori, that is, we construct two "induced homomorphisms" of the "quasi functors" t.e.K and RL for a group homomorphism whose tangent map is injective between two tori. In fact, we construct another quasi functor char and verify that three quasi functors are naturally isomorphic. Moreover, we extend the quasi functor t.e.K and char to compact connected Lie group with torsion-free fundamental group and group homomorphism satisfying "the decomposable condition", and verify that they are isomorphic. This is a generalization of a result in [FHT1].