English

Coarse-median preserving automorphisms

Geometric Topology 2024-03-06 v5 Group Theory

Abstract

This paper has three main goals. First, we study fixed subgroups of automorphisms of right-angled Artin and Coxeter groups. If φ\varphi is an untwisted automorphism of a RAAG, or an arbitrary automorphism of a RACG, we prove that Fix φ{\rm Fix}~\varphi is finitely generated and undistorted. Up to replacing φ\varphi with a power, we show that Fix φ{\rm Fix}~\varphi is quasi-convex with respect to the standard word metric. This implies that Fix φ{\rm Fix}~\varphi is separable and a special group in the sense of Haglund-Wise. By contrast, there exist "twisted" automorphisms of RAAGs for which Fix φ{\rm Fix}~\varphi is undistorted but not of type FF (hence not special), of type FF but distorted, or even infinitely generated. Secondly, we introduce the notion of "coarse-median preserving" automorphism of a coarse median group, which plays a key role in the above results. We show that automorphisms of RAAGs are coarse-median preserving if and only if they are untwisted. On the other hand, all automorphisms of Gromov-hyperbolic groups and right-angled Coxeter groups are coarse-median preserving. These facts also yield new or more elementary proofs of Nielsen realisation for RAAGs and RACGs. Finally, we show that, for every special group GG (in the sense of Haglund-Wise), every infinite-order, coarse-median preserving outer automorphism of GG can be realised as a homothety of a finite-rank median space XX equipped with a "moderate" isometric GG-action. This generalises the classical result, due to Paulin, that every infinite-order outer automorphism of a hyperbolic group HH projectively stabilises a small HH-tree.

Keywords

Cite

@article{arxiv.2101.04415,
  title  = {Coarse-median preserving automorphisms},
  author = {Elia Fioravanti},
  journal= {arXiv preprint arXiv:2101.04415},
  year   = {2024}
}

Comments

77 pages, 5 figures; v5: added references, tweaked Question 4; to appear in Geometry & Topology

R2 v1 2026-06-23T22:03:48.945Z