Free factor complex

In mathematics, the free factor complex (sometimes also called the complex of free factors) is a free group counterpart of the notion of the curve complex of a finite type surface. The free factor complex was originally introduced in a 1998 paper of Hatcher and Vogtmann.^[1] Like the curve complex, the free factor complex is known to be Gromov-hyperbolic. The free factor complex plays a significant role in the study of large-scale geometry of $\operatorname {Out} (F_{n})$ .

Formal definition

For a free group $G$ a proper free factor of $G$ is a subgroup $A\leq G$ such that $A\neq \{1\},A\neq G$ and that there exists a subgroup $B\leq G$ such that $G=A\ast B$ .

Let $n\geq 3$ be an integer and let $F_{n}$ be the free group of rank $n$ . The free factor complex ${\mathcal {F}}_{n}$ for $F_{n}$ is a simplicial complex where:

(1) The 0-cells are the conjugacy classes in $F_{n}$ of proper free factors of $F_{n}$ , that is

{\mathcal {F}}_{n}^{(0)}=\{[A]|A\leq F_{n}{\text{ is a proper free factor of }}F_{n}\}.

(2) For $k\geq 1$ , a $k$ -simplex in ${\mathcal {F}}_{n}$ is a collection of $k+1$ distinct 0-cells $\{v_{0},v_{1},\dots ,v_{k}\}\subset {\mathcal {F}}_{n}^{(0)}$ such that there exist free factors $A_{0},A_{1},\dots ,A_{k}$ of $F_{n}$ such that $v_{i}=A_{i}$ for $i=0,1,\dots ,k$ , and that $A_{0}\leq A_{1}\leq \dots \leq A_{k}$ . [The assumption that these 0-cells are distinct implies that $A_{i}\neq A_{i+1}$ for $i=0,1,\dots ,k-1$ ]. In particular, a 1-cell is a collection $\{[A],[B]\}$ of two distinct 0-cells where $A,B\leq F_{n}$ are proper free factors of $F_{n}$ such that $A\lneq B$ .

For $n=2$ the above definition produces a complex with no $k$ -cells of dimension $k\geq 1$ . Therefore, ${\mathcal {F}}_{2}$ is defined slightly differently. One still defines ${\mathcal {F}}_{2}^{(0)}$ to be the set of conjugacy classes of proper free factors of $F_{2}$ ; (such free factors are necessarily infinite cyclic). Two distinct 0-simplices $\{v_{0},v_{1}\}\subset {\mathcal {F}}_{2}^{(0)}$ determine a 1-simplex in ${\mathcal {F}}_{2}$ if and only if there exists a free basis $a,b$ of $F_{2}$ such that $v_{0}=[\langle a\rangle ],v_{1}=[\langle b\rangle ]$ . The complex ${\mathcal {F}}_{2}$ has no $k$ -cells of dimension $k\geq 2$ .

For $n\geq 2$ the 1-skeleton ${\mathcal {F}}_{n}^{(1)}$ is called the free factor graph for $F_{n}$ .

Main properties

For every integer $n\geq 3$ the complex ${\mathcal {F}}_{n}$ is connected, locally infinite, and has dimension $n-2$ . The complex ${\mathcal {F}}_{2}$ is connected, locally infinite, and has dimension 1.
For $n=2$ , the graph ${\mathcal {F}}_{2}$ is isomorphic to the Farey graph.
There is a natural action of $\operatorname {Out} (F_{n})$ on ${\mathcal {F}}_{n}$ by simplicial automorphisms. For a k-simplex $\Delta =\{[A_{0}],\dots ,[A_{k}]\}$ and $\varphi \in \operatorname {Out} (F_{n})$ one has $\varphi \Delta :=\{[\varphi (A_{0})],\dots ,[\varphi (A_{k})]\}$ .
For $n\geq 3$ the complex ${\mathcal {F}}_{n}$ has the homotopy type of a wedge of spheres of dimension $n-2$ .^[1]
For every integer $n\geq 2$ , the free factor graph ${\mathcal {F}}_{n}^{(1)}$ , equipped with the simplicial metric (where every edge has length 1), is a connected graph of infinite diameter.^[2]^[3]
For every integer $n\geq 2$ , the free factor graph ${\mathcal {F}}_{n}^{(1)}$ , equipped with the simplicial metric, is Gromov-hyperbolic. This result was originally established by Bestvina and Feighn;^[4] see also ^[5]^[6] for subsequent alternative proofs.
An element $\varphi \in \operatorname {Out} (F_{n})$ acts as a loxodromic isometry of ${\mathcal {F}}_{n}^{(1)}$ if and only if $\varphi$ is fully irreducible.^[4]
There exists a coarsely Lipschitz coarsely $\operatorname {Out} (F_{n})$ -equivariant coarsely surjective map ${\mathcal {FS}}_{n}\to {\mathcal {F}}_{n}^{(1)}$ , where ${\mathcal {FS}}_{n}$ is the free splittings complex. However, this map is not a quasi-isometry. The free splitting complex is also known to be Gromov-hyperbolic, as was proved by Handel and Mosher. ^[7]
Similarly, there exists a natural coarsely Lipschitz coarsely $\operatorname {Out} (F_{n})$ -equivariant coarsely surjective map $CV_{n}\to {\mathcal {F}}_{n}^{(1)}$ , where $CV_{n}$ is the (volume-ones normalized) Culler–Vogtmann Outer space, equipped with the symmetric Lipschitz metric. The map $\pi$ takes a geodesic path in $CV_{n}$ to a path in ${\mathcal {F}}F_{n}$ contained in a uniform Hausdorff neighborhood of the geodesic with the same endpoints.^[4]
The hyperbolic boundary $\partial {\mathcal {F}}_{n}^{(1)}$ of the free factor graph can be identified with the set of equivalence classes of "arational" $F_{n}$ -trees in the boundary $\partial CV_{n}$ of the Outer space $CV_{n}$ .^[8]
The free factor complex is a key tool in studying the behavior of random walks on $\operatorname {Out} (F_{n})$ and in identifying the Poisson boundary of $\operatorname {Out} (F_{n})$ .^[9]

Other models

There are several other models which produce graphs coarsely $\operatorname {Out} (F_{n})$ -equivariantly quasi-isometric to ${\mathcal {F}}_{n}^{(1)}$ . These models include:

The graph whose vertex set is ${\mathcal {F}}_{n}^{0}$ and where two distinct vertices $v_{0},v_{1}$ are adjacent if and only if there exists a free product decomposition $F_{n}=A\ast B\ast C$ such that $v_{0}=[A]$ and $v_{1}=[B]$ .
The free bases graph whose vertex set is the set of $F_{n}$ -conjugacy classes of free bases of $F_{n}$ , and where two vertices $v_{0},v_{1}$ are adjacent if and only if there exist free bases ${\mathcal {A}},{\mathcal {B}}$ of $F_{n}$ such that $v_{0}=[{\mathcal {A}}],v_{1}=[{\mathcal {B}}]$ and ${\mathcal {A}}\cap {\mathcal {B}}\neq \varnothing$ .^[5]

References

^ ^a ^b Allen Hatcher, and Karen Vogtmann, The complex of free factors of a free group. Quarterly Journal of Mathematics, Oxford Ser. (2) 49 (1998), no. 196, pp. 459–468
^ Ilya Kapovich and Martin Lustig, Geometric intersection number and analogues of the curve complex for free groups. Geometry & Topology 13 (2009), no. 3, pp. 1805–1833
^ Jason Behrstock, Mladen Bestvina, and Matt Clay, Growth of intersection numbers for free group automorphisms. Journal of Topology 3 (2010), no. 2, pp. 280–310
^ ^a ^b ^c Mladen Bestvina and Mark Feighn, Hyperbolicity of the complex of free factors. Advances in Mathematics 256 (2014), pp. 104–155
^ ^a ^b Ilya Kapovich and Kasra Rafi, On hyperbolicity of free splitting and free factor complexes. Groups, Geometry, and Dynamics 8 (2014), no. 2, pp. 391–414
^ Arnaud Hilion and Camille Horbez, The hyperbolicity of the sphere complex via surgery paths, Journal für die reine und angewandte Mathematik 730 (2017), 135–161
^ Michael Handel and Lee Mosher, The free splitting complex of a free group, I: hyperbolicity. Geometry & Topology, 17 (2013), no. 3, 1581--1672. MR 3073931doi:10.2140/gt.2013.17.1581
^ Mladen Bestvina and Patrick Reynolds, The boundary of the complex of free factors. Duke Mathematical Journal 164 (2015), no. 11, pp. 2213–2251
^ Camille Horbez, The Poisson boundary of $\operatorname {Out} (F_{N})$ . Duke Mathematical Journal 165 (2016), no. 2, pp. 341–369

Formal definition

Main properties

Other models

References

See also