Relative geometric assembly and mapping cones, Part II: Chern characters and the Novikov property

Abstract

We study Chern characters and the assembly mapping for free actions using the framework of geometric K-homology. The focus is on the relative groups associated with a group homomorphism φ:1 2 along with applications to Novikov type properties. In particular, we prove a relative strong Novikov property for homomorphisms of hyperbolic groups and a relative strong 1-Novikov property for polynomially bounded homomorphisms of groups with polynomially bounded cohomology in . As a corollary, relative higher signatures on a manifold with boundary W, with π1(∂ W) π1(W) belonging to the class above, are homotopy invariant.