Stabiliser of an attractive fixed point of an IWIP automorphism of a free product
Stabiliser of an attractive fixed point of an IWIP automorphism of a free product
For a group $G$ of finite Kurosh rank and for some arbiratily free product decomposition of $G$, $G = H_1 \ast H_2 \ast ... \ast H_r \ast F_q$, where $F_q$ is a finitely generated free group, we can associate some (relative) outer space $\mathcal{O}(G, \{H_1,..., H_r \})$. We define the relative boundary $\partial (G, \{ H_1, ..., H_r \}) = \partial(G, \mathcal{O}) $ corresponding to the free product decomposition, as the set of infinite reduced words (with respect to free product length). By denoting $Out(G, \{ H_1, ..., H_r \})$ the subgroup of $Out(G)$ which is consisted of the outer automorphisms which preserve the set of conjugacy classes of $H_i$'s, we prove that for the stabiliser $Stab(X)$ of an attractive fixed point in $X \in \partial (G, \{ H_1, ..., H_r \})$ of an irreducible with irreducible powers automorphism relative to $\mathcal{O}$, it holds that it has a (normal) subgroup $B$ isomorphic to subgroup of $\bigoplus \limits_{i=1} ^{r} Out(H_i)$ such that $Stab(X) / B$ is isomorphic to $\mathbb{Z}$. The proof relies heavily on the machinery of the attractive lamination of an IWIP automorphism relative to $\mathcal{O}$.
math.GR
Syrigos, Dionysios
e698e7fe-fb8a-44e8-a9b5-972f772260c1
Syrigos, Dionysios
e698e7fe-fb8a-44e8-a9b5-972f772260c1
Syrigos, Dionysios
(2016)
Stabiliser of an attractive fixed point of an IWIP automorphism of a free product.
arXiv.
(Submitted)
Abstract
For a group $G$ of finite Kurosh rank and for some arbiratily free product decomposition of $G$, $G = H_1 \ast H_2 \ast ... \ast H_r \ast F_q$, where $F_q$ is a finitely generated free group, we can associate some (relative) outer space $\mathcal{O}(G, \{H_1,..., H_r \})$. We define the relative boundary $\partial (G, \{ H_1, ..., H_r \}) = \partial(G, \mathcal{O}) $ corresponding to the free product decomposition, as the set of infinite reduced words (with respect to free product length). By denoting $Out(G, \{ H_1, ..., H_r \})$ the subgroup of $Out(G)$ which is consisted of the outer automorphisms which preserve the set of conjugacy classes of $H_i$'s, we prove that for the stabiliser $Stab(X)$ of an attractive fixed point in $X \in \partial (G, \{ H_1, ..., H_r \})$ of an irreducible with irreducible powers automorphism relative to $\mathcal{O}$, it holds that it has a (normal) subgroup $B$ isomorphic to subgroup of $\bigoplus \limits_{i=1} ^{r} Out(H_i)$ such that $Stab(X) / B$ is isomorphic to $\mathbb{Z}$. The proof relies heavily on the machinery of the attractive lamination of an IWIP automorphism relative to $\mathcal{O}$.
Text
1603.02846v1
- Author's Original
Available under License Other.
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Submitted date: 9 March 2016
Keywords:
math.GR
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Local EPrints ID: 440734
URI: http://eprints.soton.ac.uk/id/eprint/440734
PURE UUID: 0db1e35c-a37f-41a3-9e3f-e45cfcb95cf8
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Date deposited: 14 May 2020 16:46
Last modified: 16 Mar 2024 07:49
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Author:
Dionysios Syrigos
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