English

Infinite Volume and Infinite Injectivity Radius

Group Theory 2024-04-19 v3 Differential Geometry

Abstract

We prove the following conjecture of Margulis. Let GG be a higher rank simple Lie group and let ΛG\Lambda\le G be a discrete subgroup of infinite covolume. Then, the locally symmetric space Λ\G/K\Lambda\backslash G/K admits injected balls of any radius. This can be considered as a geometric interpretation of the celebrated Margulis normal subgroup theorem. However, it applies to general discrete subgroups not necessarily associated to lattices. Yet, the result is new even for subgroups of infinite index of lattices. We establish similar results for higher rank semisimple groups with Kazhdan's property (T). We prove a stiffness result for discrete stationary random subgroups in higher rank semisimple groups and a stationary variant of the St\"{u}ck-Zimmer theorem for higher rank semisimple groups with property (T). We also show that a stationary limit of a measure supported on discrete subgroups is almost surely discrete.

Keywords

Cite

@article{arxiv.2101.00640,
  title  = {Infinite Volume and Infinite Injectivity Radius},
  author = {Mikolaj Fraczyk and Tsachik Gelander},
  journal= {arXiv preprint arXiv:2101.00640},
  year   = {2024}
}

Comments

We added some examples (in particular 6.8) to the previous version

R2 v1 2026-06-23T21:43:29.224Z