Hyperbolic manifolds that fiber algebraically up to dimension 8

Abstract

We construct some cusped finite-volume hyperbolic n-manifolds Mn that fiber algebraically in all the dimensions 5≤ n ≤ 8. That is, there is a surjective homomorphism π1(Mn) Z with finitely generated kernel. The kernel is also finitely presented in the dimensions n=7, 8, and this leads to the first examples of hyperbolic n-manifolds Mn whose fundamental group is finitely presented but not of finite type. These n-manifolds Mn have infinitely many cusps of maximal rank and hence infinite Betti number bn-1. They cover the finite-volume manifold Mn. We obtain these examples by assigning some appropriate colours and states to a family of right-angled hyperbolic polytopes P5, …, P8, and then applying some arguments of Jankiewicz, Norin, Wise and Bestvina, Brady. We exploit in an essential way the remarkable properties of the Gosset polytopes dual to Pn, and the algebra of integral octonions for the crucial dimensions n=7,8.