Which Nilpotent Groups are Self-Similar?
Abstract
Let be a finitely generated torsion free nilpotent group, and let be the space of infinite words over a finite alphabet . We investigate two types of self-similar actions of on , namely the faithfull actions with dense orbits and the free actions. A criterion for the existence of a self-similar action of each type is established. Two corollaries about the nilmanifolds are deduced. The first involves the nilmanifolds endowed with an Anosov diffeomorphism, and the second about the existence of an affine structure. Then we investigate the virtual actions of , i.e. actions of a subgroup of finite index. A formula, with some number theoretical content, is found for the minimal cardinal of an alphabet endowed with a virtual self-similar action on of each type.
Cite
@article{arxiv.2101.11291,
title = {Which Nilpotent Groups are Self-Similar?},
author = {Olivier Mathieu},
journal= {arXiv preprint arXiv:2101.11291},
year = {2021}
}