Growth Rate Gap for Stable Subgroups
Group Theory
2024-12-17 v1
Abstract
We prove that stable subgroups of Morse local-to-global groups exhibit a growth gap. That is, the growth rate of an infinite-index stable subgroup is strictly less than the growth rate of the ambient Morse local-to-global group. This generalizes a result of Cordes, Russell, Spriano, and Zalloum in the sense that we removed the additional torsion-free or residually finite assumptions. The Morse local-to-global groups are a very broad class of groups, including mapping class groups, CAT(0) groups, closed -manifold groups, certain relatively hyperbolic groups, virtually solvable groups, etc.
Cite
@article{arxiv.2412.11244,
title = {Growth Rate Gap for Stable Subgroups},
author = {Suzhen Han and Qing Liu},
journal= {arXiv preprint arXiv:2412.11244},
year = {2024}
}
Comments
11 pages,2 figures