Cohomological invariants of representations of 3-manifold groups

Abstract

Suppose is a discrete group, and α∈ Z3(B;A), with A an abelian group. Given a representation :π1(M), with M a closed 3-manifold, put F(M,)=(B)[α],[M], where B:M B is a continuous map inducing which is unique up to homotopy, and -,-:H3(M;A)× H3(M;Z) A is the pairing. We extend the definition of F(M,) to manifolds with corners, and establish a gluing law. Based on these, we present a practical method for computing F(M,) when M is given by a surgery along a link L⊂ S3. In particular, the Chern-Simons invariant can be computed this way.