On the action of relatively irreducible automorphisms on their train tracks
On the action of relatively irreducible automorphisms on their train tracks
Let G be a group and let G be a free factor system of G, namely a free splitting of G as G=G1∗⋯∗Gk∗Fr. In this paper, we study the set of train track points for G-irreducible automorphisms ϕ with exponential growth (relatively to G). Such set is known to coincide with the minimally displaced set Min(ϕ) of ϕ.
Our main result is that Min(ϕ) is co-compact, under the action of the cyclic subgroup generated by ϕ.
Along the way we obtain other results that could be of independent interest. For instance, we prove that any point of Min(ϕ) is in uniform distance from Min(ϕ−1). We also prove that the action of G on the product of the attracting and the repelling trees for ϕ, is discrete. Finally, we get some fine insight about the local topology of relative outer space.
As an application, we generalise a classical result of Bestvina, Feighn and Handel for the centralisers of irreducible automorphisms of free groups, in the more general context of relatively irreducible automorphisms of a free product. We also deduce that centralisers of elements of Out(F3) are finitely generated, which was previously unknown. Finally, we mention that an immediate corollary of co-compactness is that Min(ϕ) is quasi-isometric to a line.
math.GR, math.GT
Francaviglia, Stefano
91be45eb-fadf-48ed-abe8-107c65f85c6c
Martino, Armando
65f1ff81-7659-4543-8ee2-0a109be286f1
Syrigos, Dionysios
e698e7fe-fb8a-44e8-a9b5-972f772260c1
Francaviglia, Stefano
91be45eb-fadf-48ed-abe8-107c65f85c6c
Martino, Armando
65f1ff81-7659-4543-8ee2-0a109be286f1
Syrigos, Dionysios
e698e7fe-fb8a-44e8-a9b5-972f772260c1
Francaviglia, Stefano, Martino, Armando and Syrigos, Dionysios
(2024)
On the action of relatively irreducible automorphisms on their train tracks.
Annales de l'Institut Fourier.
(doi:10.48550/arXiv.2108.01680).
(In Press)
Abstract
Let G be a group and let G be a free factor system of G, namely a free splitting of G as G=G1∗⋯∗Gk∗Fr. In this paper, we study the set of train track points for G-irreducible automorphisms ϕ with exponential growth (relatively to G). Such set is known to coincide with the minimally displaced set Min(ϕ) of ϕ.
Our main result is that Min(ϕ) is co-compact, under the action of the cyclic subgroup generated by ϕ.
Along the way we obtain other results that could be of independent interest. For instance, we prove that any point of Min(ϕ) is in uniform distance from Min(ϕ−1). We also prove that the action of G on the product of the attracting and the repelling trees for ϕ, is discrete. Finally, we get some fine insight about the local topology of relative outer space.
As an application, we generalise a classical result of Bestvina, Feighn and Handel for the centralisers of irreducible automorphisms of free groups, in the more general context of relatively irreducible automorphisms of a free product. We also deduce that centralisers of elements of Out(F3) are finitely generated, which was previously unknown. Finally, we mention that an immediate corollary of co-compactness is that Min(ϕ) is quasi-isometric to a line.
Text
2108.01680v1
- Author's Original
Available under License Other.
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Submitted date: 3 August 2021
Accepted/In Press date: 12 April 2024
Keywords:
math.GR, math.GT
Identifiers
Local EPrints ID: 474386
URI: http://eprints.soton.ac.uk/id/eprint/474386
ISSN: 1777-5310
PURE UUID: 850ca60a-8733-4124-8e4a-e9eff8e92d9f
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Date deposited: 21 Feb 2023 17:40
Last modified: 16 May 2024 01:41
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Author:
Stefano Francaviglia
Author:
Dionysios Syrigos
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