Deformations of reducible SL(n,C) representations of fibered 3-manifold groups

Abstract

Let Mφ be a surface bundle over a circle with monodromy φ:S → S. We study deformations of certain reducible representations of π1(Mφ) into SL(n,C), obtained by composing a reducible representation into SL(2,C) with the irreducible representation SL(2,C) → SL(n,C). In particular, we show that under certain conditions on the eigenvalues of φ*, the reducible representation is contained in a (n+1+k)(n-1) dimensional component of the representation variety, where k is the number of components of ∂ Mφ. This result applies to mapping tori of pseudo-Anosov maps with orientable invariant foliations whenever 1 is not an eigenvalue of the induced map on homology, where the reducible representation is also a limit of irreducible representations.