Random rigidity in the free group
Group Theory
2013-07-09 v2 Dynamical Systems
Geometric Topology
Abstract
We prove a rigidity theorem for the geometry of the unit ball in random subspaces of the scl norm in B_1^H of a free group. In a free group F of rank k, a random word w of length n (conditioned to lie in [F,F]) has scl(w)=log(2k-1)n/6log(n) + o(n/log(n)) with high probability, and the unit ball in a subspace spanned by d random words of length O(n) is C^0 close to a (suitably affinely scaled) octahedron. A conjectural generalization to hyperbolic groups and manifolds (discussed in the appendix) would show that the length of a random geodesic in a hyperbolic manifold can be recovered from the bounded cohomology of the fundamental group.
Keywords
Cite
@article{arxiv.1104.1768,
title = {Random rigidity in the free group},
author = {Danny Calegari and Alden Walker},
journal= {arXiv preprint arXiv:1104.1768},
year = {2013}
}
Comments
28 pages, 9 figures; version 2 incorporates referee's comments