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Main Author: Leemann, Paul-Henry
Format: Preprint
Published: 2019
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Online Access:https://arxiv.org/abs/1910.06399
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author Leemann, Paul-Henry
author_facet Leemann, Paul-Henry
contents Let $G$ be a branch group acting by automorphisms on a rooted tree $T$. Stabilizers of infinite rays in $T$ are examples of weakly maximal subgroups of $G$ (subgroups that are maximal among subgroups of infinite index), but in general they are not the only examples. In this note we describe two families of weakly maximal subgroups of branch groups. We show that, for the first Grigorchuk group as well as for the torsion GGS groups, every weakly maximal subgroup belongs to one of these families. The first family is a generalization of stabilizers of rays, while the second one consists of weakly maximal subgroups with a block structure. We obtain different equivalent characterizations of these families in terms of finite generation, the existence of a trivial rigid stabilizer, the number of orbit-closures for the action on the boundary of the tree or by the means of sections.
format Preprint
id arxiv_https___arxiv_org_abs_1910_06399
institution arXiv
publishDate 2019
record_format arxiv
spellingShingle Weakly maximal subgroups of branch groups
Leemann, Paul-Henry
Group Theory
20F65
Let $G$ be a branch group acting by automorphisms on a rooted tree $T$. Stabilizers of infinite rays in $T$ are examples of weakly maximal subgroups of $G$ (subgroups that are maximal among subgroups of infinite index), but in general they are not the only examples. In this note we describe two families of weakly maximal subgroups of branch groups. We show that, for the first Grigorchuk group as well as for the torsion GGS groups, every weakly maximal subgroup belongs to one of these families. The first family is a generalization of stabilizers of rays, while the second one consists of weakly maximal subgroups with a block structure. We obtain different equivalent characterizations of these families in terms of finite generation, the existence of a trivial rigid stabilizer, the number of orbit-closures for the action on the boundary of the tree or by the means of sections.
title Weakly maximal subgroups of branch groups
topic Group Theory
20F65
url https://arxiv.org/abs/1910.06399