The geometry of $k$-free hyperbolic $3$-manifolds

TL;DR

This paper explores the geometric properties of hyperbolic 3-manifolds with $k$-free fundamental groups, establishing bounds on the rank of certain subsets of loops and improving previous results for specific cases.

Contribution

It generalizes existing results to all $k \\ge 3$, providing new bounds on the rank of loop subsets in hyperbolic 3-manifolds with $k$-free fundamental groups.

Findings

Any such manifold contains a point with controlled loop subset ranks.

The results relate the volume of the manifold to its topological properties.

Improves upon previous bounds for the case $k=5$.

Abstract

We investigate the geometry of closed, orientable, hyperbolic $3$-manifolds whose fundamental groups are $k$-free for a given integer $k\ge 3$. 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 $\pi_1(M,P)$ represented by loops of length $<\log(2k-1)$, then for every subset $T \subset S$, we have ${\rm rank}\ T \le k-3$. This generalizes to all $k\ge3$ 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].