Morse-Novikov theory for links

Abstract

For a compact 3-manifold W. Thurston introduced a norm on the first cohomology group of the manifold. The unit ball B of this norm is a polyhedron and the set of cohomology classes that are representable by fibrations over a circle is a union of cones on some of the open faces of B. In the present paper we study the fibred faces of the Thurston polyhedra of exteriors of links in S3. Our approach is based on the non-abelian Novikov homology associated with the universal covering of the exterior of the link. We prove in particular that for a 2-component 2-bridge link L a cohomology class ξ∈ H1(E(L)) can be represented by a fibration over a circle if and only if its 2-variable Alexander polynomial is ξ-monic. We compute the Morse-Novikov numbers for a majority of 2-component prime links with number of crossings ≤ 8.