English

Cantor dynamics of renormalizable groups

Dynamical Systems 2020-11-02 v2 Group Theory

Abstract

A group Γ\Gamma is said to be finitely non-co-Hopfian, or renormalizable, if there exists a self-embedding φ ⁣:ΓΓ\varphi \colon \Gamma \to \Gamma whose image is a proper subgroup of finite index. Such a proper self-embedding is called a renormalization for Γ\Gamma. In this work, we associate a dynamical system to a renormalization φ\varphi of Γ\Gamma. The discriminant invariant Dφ{\mathcal D}_{\varphi} of the associated Cantor dynamical system is a profinite group which is a measure of the asymmetries of the dynamical system. If Dφ{\mathcal D}_{\varphi} is a finite group for some renormalization, we show that Γ/Cφ\Gamma/C_{\varphi} is virtually nilpotent, where CφC_{\varphi} is the kernel of the action map. We introduce the notion of a (virtually) renormalizable Cantor action, and show that the action associated to a renormalizable group is virtually renormalizable. We study the properties of virtually renormalizable Cantor actions, and show that virtual renormalizability is an invariant of continuous orbit equivalence. Moreover, the discriminant invariant of a renormalizable Cantor action is an invariant of continuous orbit equivalence. Finally, the notion of a renormalizable Cantor action is related to the notion of a self-replicating group of automorphisms of a rooted tree.

Keywords

Cite

@article{arxiv.2002.01565,
  title  = {Cantor dynamics of renormalizable groups},
  author = {Steven Hurder and Olga Lukina and Wouter Van Limbeek},
  journal= {arXiv preprint arXiv:2002.01565},
  year   = {2020}
}

Comments

A discussion was added to the text on the relation between renormalizable actions and self-replicating actions of a rooted tree. Additionally, several proofs were rewritten to make the arguments easier to follow

R2 v1 2026-06-23T13:31:24.875Z