The bounded Borel class and complex representations of 3-manifold groups

Abstract

If <PSL(2,C) is a lattice, we define an invariant of a representation → PSL(n,C) using the Borel class β(n)∈ H3c(PSL(n,C),R). We show that the invariant is bounded and its maximal value is attained by conjugation of the composition of the lattice embedding with the irreducible complex representation PSL(2,C)→ PSL(n,C). Major ingredients of independent interest are the extension to degenerate configuration of flags of a Goncharov cocycle and its study, as well as the identification of H3c(SL(n,C),R) as a normed space.