English

Quantifying lawlessness in finitely generated groups

Group Theory 2022-01-11 v2

Abstract

We introduce a quantitative notion of lawlessness for finitely generated groups, encoded by the "lawlessness growth function" AΓ:NN\mathcal{A}_{\Gamma} : \mathbb{N} \rightarrow \mathbb{N}. We show that AΓ\mathcal{A}_{\Gamma} is bounded iff Γ\Gamma has a nonabelian free subgroup. By contrast we construct, for any nondecreasing unbounded function f:NNf: \mathbb{N} \rightarrow \mathbb{N}, an elementary amenable lawless groups for which AΓ\mathcal{A}_{\Gamma} grows more slowly that ff. We produce torsion lawless groups for which AΓ\mathcal{A}_{\Gamma} is at least linear using Golod-Shafarevich theory, and give some upper bounds on AΓ\mathcal{A}_{\Gamma} for Grigorchuk's group and Thompson's group F\mathbf{F}. We note some connections between AΓ\mathcal{A}_{\Gamma} and quantitative versions of residual finiteness. Finally, we also describe a function MΓ\mathcal{M}_{\Gamma} quantifying the property of Γ\Gamma having no mixed identities, and give bounds for nonabelian free groups. By contrast with AΓ\mathcal{A}_{\Gamma}, there are no groups for which MΓ\mathcal{M}_{\Gamma} is bounded: we prove a universal lower bound on MΓ(n)\mathcal{M}_{\Gamma}(n) of the order of log(n)\log (n).

Keywords

Cite

@article{arxiv.2112.08875,
  title  = {Quantifying lawlessness in finitely generated groups},
  author = {Henry Bradford},
  journal= {arXiv preprint arXiv:2112.08875},
  year   = {2022}
}

Comments

Theorem 1.2 has been significantly strengthened; other minor corrections

R2 v1 2026-06-24T08:20:21.976Z