Profinite rigidity, fibering, and the figure-eight knot

Abstract

We establish results concerning the profinite completions of 3-manifold groups. In particular, we prove that the complement of the figure-eight knot S3-K is distinguished from all other compact 3-manifolds by the set of finite quotients of its fundamental group. In addition, we show that if M is a compact 3-manifold with b1(M)=1, and π1(M) has the same finite quotients as a free-by-cyclic group Fr, then M has non-empty boundary, fibres over the circle with compact fibre, and π1(M) Fr for some ∈Out(Fr).