English

Intransitive Self-similar Groups

Group Theory 2020-04-22 v2

Abstract

A group is said to be self-similar provided it admits a faithful state-closed representation on some regular mm-tree and the group is said to be transitive self-similar provided additionally it induces transitive action on the first level of the tree. A standard approach for constructing a transitive self-similar representation of a group has been by way of a single virtual endomorphism of \ the group in question. Recently, it was shown that this approach when applied to the restricted wreath product % \mathbb{Z}\wr \mathbb{Z} could not produce a faithful transitive self-similar representations for any m2m\geq 2 (see, \cite{DS}). In this work we study state-closed representations without assuming the transitivity condition. This general action is translated into a set of virtual endomorphisms corresponding to the different orbits of the action on the first level of the tree. In this manner, we produce faithful self-similar representations, some of which are also finite-state, for a number of groups such as Zω\mathbb{Z}^{\omega}, ZZ\mathbb{Z}\wr \mathbb{Z} and (ZZ)C2(\mathbb{Z} \wr \mathbb{Z}) \wr C_{2}.

Keywords

Cite

@article{arxiv.2004.08941,
  title  = {Intransitive Self-similar Groups},
  author = {Alex C. Dantas and Tulio M. G. Santos and Said N. Sidki},
  journal= {arXiv preprint arXiv:2004.08941},
  year   = {2020}
}
R2 v1 2026-06-23T14:57:08.263Z