Odd characteristic classes in entire cyclic homology and equivariant loop space homology

Abstract

Given a compact manifold M and g∈ C∞(M,U(l;C)) we construct a Chern character Ch-(g) which lives in the odd part of the equivariant (entire) cyclic Chen-normalized bar complex C(T(M× T)) of M, and which is mapped to the odd Bismut-Chern character under the equivariant Chen integral map. It is also shown that the assignment g Ch-(g) induces a well-defined group homomorphism from the K-1 theory of M to the odd homology group of C(T(M× T))