Counting automorphic orbits in finitely generated groups
Group Theory
2026-05-04 v2
Abstract
We study an analogue of the conjugacy growth function in finitely generated groups: the automorphic growth function. This counts the number of automorphic orbits that intersect the ball of radius in the group. We show that this is not a commensurability invariant, by giving virtually abelian counterexamples. We classify the automorphic growth rate of all virtually abelian groups of rank at most , the Heisenberg group, finite rank free groups and Thompson's groups and . This last computation allows to conclude that and have exponential conjugacy growth.
Cite
@article{arxiv.2604.18104,
title = {Counting automorphic orbits in finitely generated groups},
author = {Luna Elliott and Alex Evetts and Alex Levine},
journal= {arXiv preprint arXiv:2604.18104},
year = {2026}
}
Comments
43 pages, 4 figures