The ω-Borel invariant for representations into SL(n,Cω)

Abstract

Let be the fundamental group of a complete hyperbolic 3-manifold M with toric cusps. We define the ω-Borel invariant βnω(ω) associated to a representation ω: → SL(n,Cω), where Cω is a field which can be constructed as a quotient of a suitable subset of CN with the data of a non-principal ultrafilter ω on N and a real divergent sequence λl such that λl ≥ 1. Since a sequence of ω-bounded representations l into SL(n,C) determines a representation ω into SL(n,Cω), for n=2 we study the relation between the invariant βω2(ω) and the sequence of Borel invariants β2(l). We conclude by showing that if a sequence of representations l: → SL(2,C) induces a representation ω: → SL(2,Cω) which determines a reducible action on the asymptotic cone Cω(H3,d/λl,O) with non-trivial length function, then it holds βω2(ω)=0.