Explicit rank bounds for cyclic covers

Abstract

Let M be a closed, orientable hyperbolic 3-manifold and φ a homomorphism of its fundamental group onto Z that is not induced by a fibration over the circle. For each natural number n we give an explicit lower bound, linear in n, on rank of the fundamental group of the cover of M corresponding to φ-1(nZ). The key new ingredient is the following result: for such a manifold M and a connected, two-sided incompressible surface of genus g in M that is not a fiber or semi-fiber, a reduced homotopy in (M,S) has length at most 14g-12.