The geometry of k-free hyperbolic 3-manifolds

Abstract

We investigate the geometry of closed, orientable, hyperbolic 3-manifolds whose fundamental groups are k-free for a given integer k 3. We show that any such manifold M contains a point P of M with the following property: If S is the set of elements of π1(M,P) represented by loops of length <(2k-1), then for every subset T ⊂ S, we have rank\ T k-3. This generalizes to all k3 results proved in [6] and [10], which have been used to relate the volume of a hyperbolic manifold to its topological properties, and it strictly improves on the result obtained in [11] for k=5. The proof avoids the use of results about ranks of joins and intersections in free groups that were used in [10] and [11].