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The base group of a wreath product of an abelian group by $ {\mathbb{Z}}$ is a characterstic subgroup

I've copied over this question from what I asked on Mathematics Stack Exchange, in the hope that some experts here can direct me to some relevant results. Let $A$ be a finitely generated abelian group,...
ghc1997's user avatar
  • 823
11 votes
1 answer
250 views

Recognising the elements of the Grigorchuk group

The Grigorchuk group $\mathfrak{G}= \langle a,b,c,d \rangle$ is a group of automorphisms of the infinite rooted binary tree $\mathcal{T}_2$. Every element of $\mathfrak{G}$ can be represented by a ...
AGenevois's user avatar
  • 8,401
2 votes
0 answers
68 views

Amplification argument for hyperlinear groups

Let us define a group $G$ to be a hyperlinear group if it satisfies the conclusion of Theorem 3.6. in these notes by Vladimir Pestov. It is well-known that one can use the so-called amplification ...
Keivan Karai's user avatar
  • 6,224
3 votes
1 answer
165 views

When the fundamental group of subgraph of groups embeds?

Given a connected graph of groups $\mathcal G$ (where edge maps are embeddings), by a subgraph we mean a graph of groups obtain by omitting some vertices, some edges, and replacing the remaining ...
tomasz's user avatar
  • 1,338
5 votes
0 answers
200 views

Virtual fibring of $\mathrm{Out}(F_2\times F_2)$

A finitely generated group $G$ is said to virtually fibre if there is a finite index subgroup $H\leq G$ and a non-trivial map $\varphi:H\to\mathbb{Z}$ with $\ker(\varphi)$ finitely generated. I want ...
Marcos's user avatar
  • 911
1 vote
0 answers
188 views

Does every amenable group $G$ admit a two-sided Folner sequence?

By two-sided Følner sequence I mean a sequence $(F_N)_N$ of subsets of $G$ which is both a left-Følner and a right-Følner sequence. Context: I just came up with this question and surprisingly I haven'...
Saúl RM's user avatar
  • 10.6k
3 votes
1 answer
271 views

Passing to normal forms in graphs of groups

Given a word $w \in X^{\pm 1}$ representing an element of the free group $F(X)$ there is a (usually non-unique) sequence $w=w_0 \to w_1 \to \cdots \to w_r$ with $|w_i|>|w_{i+1}|$ where $w_r$ is the ...
NWMT's user avatar
  • 1,033
9 votes
1 answer
230 views

Yang-Mills algebra and lower central series of surface groups

Here is a connection that I recently noticed, but I haven't quite been able to make sense of. It might follow from well-known facts; apologies, if so. This is quite far from my area. First, in "...
Carl-Fredrik Nyberg Brodda's user avatar
2 votes
1 answer
554 views

Growth rate of an outer automorphism of a free product

$\DeclareMathOperator\Out{Out}$Let $G=G_1\ast\cdots\ast G_k\ast F_p$ be a Grushko decomposition of a finitely generated group $G$, $\mathcal{O}$ the outer space relative to this decomposition, $[\phi]\...
1123581321's user avatar
17 votes
3 answers
1k views

Examples of locally hyperbolic groups

It is well-known that a subgroup of a hyperbolic group need not be hyperbolic. Let us say that a (finitely generated) group $G$ is locally hyperbolic if all its finitely generated subgroups are (...
Jean Charles's user avatar
3 votes
0 answers
393 views

What about a Cayley n-complex for n>2?

Let $G$ be a finitely presented group. The Cayley graph of the finite generating set is a $1$-complex where the $0$-cells are the elements of $G$ and the $1$-cells are given by the generators (...
Sebastien Palcoux's user avatar
9 votes
3 answers
548 views

Spectral radius of a finitely generated group

Let $G$ be a finitely generated group and $\Gamma$ be its Cayley graph with the usual word metric. Let $\mu$ be a symmetric non-degenerate measure on $G$ (maybe with finite support or smooth), and ...
SMS's user avatar
  • 1,407
8 votes
1 answer
227 views

Non-finitely presented FP groups with cohomological dimension $2$

In this recent preprint, the authors construct a certain uncountable family of non-finitely presented FP groups. Recall that group is an FP group if the trivial $\mathbb Z[G]$-module $\mathbb Z$ has a ...
Maxime Ramzi's user avatar
  • 15.9k
1 vote
1 answer
259 views

Which properties can be read off the balls of a Cayley graph?

For which properties (P) [of groups] does the following hold: given a group $G$ which has a finite presentation with at most $n$ relations of length at most $\ell$, there is a $R(n,\ell)$ so that, if ...
ARG's user avatar
  • 4,432
8 votes
1 answer
200 views

For which planar topological spaces $Z$ does there exist a hyperbolic group $\Gamma$ with $\partial \Gamma \cong Z$?

Recall a topological space is called planar if it can be embedded in $S^2$. I'm interested in understanding hyperbolic groups with planar boundaries. In [1], it is shown that if a one-ended hyperbolic ...
jpmacmanus's user avatar
5 votes
1 answer
175 views

Growth of the word norm for elementary matrices in $\rm SL_3 (\mathbb{Z})$

This is a reference request, since the answer is probably well known, but I could not find it. Given a finitely generated group $\Gamma$ with a generating set $S$, define the word norm $l = l_S : \...
Izhar Oppenheim's user avatar
2 votes
0 answers
110 views

Moment of the hitting measure of a subgroup

Given a [finitely generated] group $G$ and a finite generating set $S$, a measure $\mu$ will have finite $\alpha$-moment if $\sum_{g \in G} \mu(g) |g|_S^\alpha$ is finite (where $|g|_S$ is the word ...
ARG's user avatar
  • 4,432
3 votes
1 answer
141 views

The stabilizer of a pair of points in the acylindrically hyperbolic group is either finite or virtually cyclic

Given a group $G$, suppose $G$ admits a non-elementary acylindrical action on a Gromov hyperbolic space $S$. I heard that stabilizer of a pair of points on $\partial S$ in the acylindrically ...
Joseph's user avatar
  • 199
4 votes
0 answers
177 views

Ping pong with parabolic isometries on Gromov hyperbolic spaces

For a group $G$ with a non-elementary general type action by isometries on a Gromov hyperbolic geodesic space $(X,d)$, it is well known that you can construct free subgroups of $G$ via the ping pong ...
user203667's user avatar
2 votes
0 answers
66 views

Quasi-isometry of solvable minimax groups

[Edits in brackets] Consider two finitely generated solvable minimax groups $G_i$ ($i = 1,2$) so that $1 \to N_i \to G_i \to Z_i \to 1$ [splits] with $N_i$ nilpotent, $Z_i$ infinite cyclic and $G_i$ ...
ARG's user avatar
  • 4,432
7 votes
3 answers
2k views

Bass-Serre theory textbook

I am a PhD freshman working on topological graph theory and geometric group theory. I would like to learn some Bass-Serre theory. What do you think is the best introductory textbook in this topic? ...
George K's user avatar
  • 422
10 votes
1 answer
602 views

hyperbolic quotient of hyperbolic group

I have a memory of hearing about a result (or perhaps a conjecture), possibly due to Gromov, that, if $G$ is a hyperbolic group and $g \in G$ has infinite order, then the quotient group $G/\langle (g^...
Derek Holt's user avatar
  • 37.4k
17 votes
1 answer
459 views

Existence of a quasi-isometric residually finite group?

It's, by now, more or less well known that residual finiteness is not a quasi-isometry invariant for finitely generated groups (see here for an example). Thus the following question makes sense: ...
Diego Martinez's user avatar
11 votes
0 answers
345 views

Status of questions in "Group Actions on $\mathbb{R}$-trees"?

Culler and Morgan's "Group Actions on $\mathbb{R}$-trees" lists four questions at the end of the introduction. A few have been famously resolved by work of Rips, Bestvina–Feighn and others. I'm ...
Robbie Lyman's user avatar
  • 1,996
4 votes
0 answers
124 views

Abelian-by-cyclic subgroups of exponential growth solvable groups

I am currently looking for a reference to a proof (or counterexample) to the following statement: Statement: Assume $G$ is a finitely generated solvable group of exponential growth, then there is a ...
ARG's user avatar
  • 4,432
9 votes
1 answer
738 views

Gromov hyperbolic groups which are solvable are elementary

I have read on wikipedia that a Gromov hyperbolic group which is solvable is elementary (i.e. virtually cyclic). Where can I find a proof of this fact? There is a proof of a similar fact in Bridson-...
Chris Z's user avatar
  • 291
3 votes
0 answers
136 views

Existence of loxodromic elements in certain subsets of $\text{PSL}_2(\mathbb C)$

Let $R$ be a subset of $\text{PSL}_2(\mathbb C)$ and consider its natural action on $\mathbb {CP}^1$. We say that $R$ is elementary if either $R$ is conjugated to a subset of $\text{SU(2)}$ or if ...
Lucas Kaufmann's user avatar
5 votes
0 answers
228 views

Automorphism groups of cocompact Fuchsian groups as mapping class groups

Let $\Gamma$ be a cocompact Fuchsian group. So it has presentation $$\langle x_1,y_1, \dots, x_g,y_g,z_1, \ldots, z_r \mid [x_1,y_1] \cdots [x_g,y_g]z_1 \cdots z_r=1, \ z_i^{m_i}=1 \rangle$$ for some $...
AGenevois's user avatar
  • 8,401
23 votes
2 answers
2k views

Modern references on hyperbolic groups

Several good references dedicated to hyperbolic groups have been written until 1990, including: Hyperbolic groups, written by M. Gromov. Géométrie et théorie des groupes : les groupes hyperboliques ...
AGenevois's user avatar
  • 8,401
11 votes
0 answers
379 views

Amalgamated product of automatic groups

In Gersten's "Problems on Automatic Groups", Problem 14, he asks the following question: Let $G=A\ast_{C}B$ where $A$ and $B$ are automatic and $C$ is infinite cyclic. Is $G$ automatic? Is this ...
YCC's user avatar
  • 525
9 votes
1 answer
495 views

Divergence of Groups and Metric Spaces

Several papers, including this and this claim that divergence of finitely generated groups and metric spaces have been introduced by Misha Gromov in his paper "Asymptotic invariants of infinite groups"...
user avatar
2 votes
1 answer
439 views

Quotient groups of the lower central series of a surface group

In the answer to MO question 132247, it is possible to find a nice computation of the quotient groups of the lower central series of a finitely generated free group. Q. What are the quotient ...
Francesco Polizzi's user avatar
8 votes
2 answers
618 views

Relative/acylindrical hyperbolicity of free-by-cyclic groups

Is this statement true? Let $\mathbb{F}$ denotes a finitely generated free group, $\Phi$ an automorphism of $\mathbb{F}$ and $\varphi$ its image in $\mathrm{Out}(\mathbb{F})$. If $\varphi$ is ...
Ma Joad's user avatar
  • 1,755
5 votes
0 answers
169 views

In the literature on infinite graphs, are there results on "periodizable" graphs?

Let $G=(V,E)$ be a connected countably infinite $k$-regular simple graph (no loops or multiple edges). For $A$ a finite subset of $V$, let me denote by $G_A=(A,E_A)$ the induced subgraph with vertex ...
Abdelmalek Abdesselam's user avatar
6 votes
1 answer
399 views

One-ended finitely presented subgroups of hyperbolic groups

In Hyperbolic groups (page 82), Gromov claims that, by a standard application of Thurston's method of geodesic (hyperbolic) simplices, it can be prove that a hyperbolic group contains finitely many ...
Seirios's user avatar
  • 2,371
4 votes
3 answers
320 views

Examples of IF-groups

I have seen that several authors say that an infinite group $G$ is an IF-group (or has the IF-property) if every subgroup of infinite index in $G$ is free (for instance, see https://arxiv.org/pdf/1607....
Pablo's user avatar
  • 11.3k
0 votes
0 answers
105 views

specific qi on free groups

Let $F_n$ be the free group on $n$ generators, $n>1$. If $\phi$ is a quasi-isometry (or a bijective bilipschitz equivalence) on $F_n$, then what can we say about the explicit form of $\phi$? In ...
Jiang's user avatar
  • 1,528
16 votes
3 answers
1k views

Torsion subgroups of hyperbolic groups are finite?

Is it true that torsion subgroups of hyperbolic groups are finite? I have a vague memory that this is true, perhaps due to Ol'shanskii, but have been struggling to find a reference. (By a torsion ...
user101216's user avatar
2 votes
1 answer
210 views

Reference proving $\beta^{(2)}_1(G) \le d(G)-1$

I saw a paper that said it is well-known that for finitely generated group $G$: $\beta^{(2)}_1(G) \le d(G)-1$, but I can't find any reference proving it. $d(G)$ denotes the minimal number of ...
Ktt's user avatar
  • 197
10 votes
2 answers
1k views

Kazhdan's property (T) vs. residual finiteness

I have asked this question already on mathstackexchange but got no answer (see https://math.stackexchange.com/questions/1795795/kazhdans-property-t-vs-residual-finiteness) and it was suggested that I ...
M.U.'s user avatar
  • 721
3 votes
0 answers
493 views

Short exact sequences for amalgamated free products and HNN Extensions

I asked this question on math stackexchange (see here) but didn't get any answer so I thought I would post it here too: If $A$ and $B$ are groups we have the following short exact sequence: $$ 0 \to [...
M.U.'s user avatar
  • 721
7 votes
0 answers
252 views

A conjecture of Lubotzky on ranks of subgroups of special linear groups over the integers

In a 1985 paper named "Dimension function for discrete groups" Lubotzky conjectured that: For any integer $n \geq 3$ the group $\mathrm{SL}_n(\mathbb{Z})$ contains infinitely many finite index ...
Pablo's user avatar
  • 11.3k
18 votes
0 answers
734 views

How boundedly generated is $SL_3(\mathbb{Z})$?

The group $G = \mathrm{SL}_3(\mathbb{Z})$ is known to be boundedly generated, that is, there exists some $m \in \mathbb{N}$, and $g_1, \dots, g_m \in G$ such that we have the following equality of ...
Pablo's user avatar
  • 11.3k
8 votes
2 answers
272 views

Roller's problem on median groups

At the end of his dissertation Poc Sets, Median Algebras and Group Actions, Martin Roller asks A group $G$ is called median if it acts freely and transitively on a median algebra. This is ...
Seirios's user avatar
  • 2,371
6 votes
2 answers
483 views

Products of elliptic isometries

A well-known property on groups acting on trees is: Theorem: Let $T$ be a tree and $g,h \in \mathrm{Isom}(T)$ two elliptic isometries. If $\mathrm{Fix}(g) \cap \mathrm{Fix}(h) = \emptyset$ then the ...
Seirios's user avatar
  • 2,371
16 votes
3 answers
2k views

Your favorite papers on geometric group theory

I would like to improve my "depth of understanding" in geometric group theory. So I am interested in short and accessible papers on subjects related to this field but which are not always ...
2 votes
1 answer
975 views

Explicit examples of Dehn presentations of hyperbolic groups

It is well known fact that a (f.g.) group is hyperbolic if and only if it admits a (finite) Dehn presentation. My question concerns something I'm struggling with since the first time I read the proof ...
M.U.'s user avatar
  • 721
3 votes
1 answer
292 views

Special linear groups over function fields

Let $p$ be a prime number, and let $q$ be a finite power of $p$. Denote by $F_q$ the unique field with $q$ elements. What is known about the structure and properties of $\mathrm{SL}_2(F_q[t])$ as ...
Pablo's user avatar
  • 11.3k
5 votes
1 answer
329 views

A hyperbolic group with a small profinite completion

Is there a finitely generated non-elementary word hyperbolic group the profinite completion of which is known (or conjectured) to be rather restricted, that is: abelian, pro-$p$, virtually prosolvable,...
Pablo's user avatar
  • 11.3k
3 votes
0 answers
209 views

Growth of the number of generators in hyperbolic groups

Let $G$ be an infinite hyperbolic group, and let us further assume that it is residually finite (or even LERF/GFERF) so that we have plenty of subgroups of finite index. I would like to know if one ...
Pablo's user avatar
  • 11.3k