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Groups (not?) quasi-retracting onto $\mathbb{Z}$ via closest points projection

Inspired by this question we ask: Suppose that $G$ is an infinite group. Suppose that $X$ is a finite generating set of $G$. Let $\Gamma = \Gamma(G, X)$ be the resulting Cayley graph. Does $\Gamma$ ...
Sam Nead's user avatar
  • 28.2k
6 votes
1 answer
200 views

Are finitely generated subgroups of $\text{GL}_n(\mathbb{Q})$ virtually special?

This might be a silly question--but are there any examples of finitely generated subgroups of $\text{GL}_n(\mathbb{Q})$ that are known to not be virtually special?
user2357's user avatar
  • 103
4 votes
0 answers
83 views

Additive characters from coarse quotient maps

Let's consider a (finitely generated) group $\Gamma$ and a coarse quotient map $q\colon\Gamma\to\mathbb{R}$. I'm interested in the 1-cocycle $\sigma\colon\Gamma\to\ell_\infty\Gamma$, defined by $\...
Narutaka OZAWA's user avatar
6 votes
1 answer
207 views

Coarse embeddings and Gromov products in (Gromov) hyperbolic spaces

I am new into geometric group theory and I have recently started reading the book "Sur les Groupes Hyperboliques d’après Mikhael Gromov" by Ghys and de la Harpe. The following inequality ...
Steve's user avatar
  • 101
1 vote
0 answers
92 views

$L^p$-compression of metabelian groups

Question: Is there a metabelian group, so that for some $\epsilon >0$ and all $p \in [1, \infty[$ the [equivariant] compression exponent in [any] $L^p$-space is bounded by $1-\epsilon$ (bound does ...
ARG's user avatar
  • 4,432
1 vote
1 answer
161 views

Divergence functions in hyperbolic groups

Gromov hyperbolicity has many characterizations, one of them being the existence of a super-linear divergence function, see definition below. We note that in $\mathbb{R}^2$ there is no divergence ...
Strichcoder's user avatar
5 votes
1 answer
155 views

Variants of the Bonk-Schramm embedding

Recently I heard about the following embedding theorem of Bonk and Schramm: every Gromov hyperbolic geodesic metric space with "bounded growth" is roughly similar to a convex subset of $\...
Takao Hishikori's user avatar
4 votes
4 answers
405 views

Groups acting non-properly cocompactly on hyperbolic spaces

A group $G$ is hyperbolic if it admits a geometric (the action is proper and co-bounded) action on a geodesic hyperbolic metric space. Also, the definition can be given as follows, a group $G$ ...
bishop1989's user avatar
4 votes
2 answers
311 views

Injective hulls of metric spaces

In the context of large scale geometry and geometric group theory, I have recently come across the concept of injective hulls of metric spaces. For a metric space $X$, let $\text{In}(X)$ be the set of ...
Sebastian's user avatar
8 votes
2 answers
489 views

Amalgamated product acting on CAT(0) cube complex

I was reading the following result from the book Metric spaces of non-positive curvature by Bridson and Haefliger. Result: Let $F_0,F_1$ and $H$ be groups acting properly by isometries on complete $...
bishop1989's user avatar
2 votes
0 answers
135 views

Need help understanding the geometry of a particular building structure

$\DeclareMathOperator\SL{SL}$I’m not primarily a geometer, so apologies if this question is worded poorly. I’ve been looking at asymptotic cones of connected semisimple Lie groups with at least one ...
jsch's user avatar
  • 21
3 votes
0 answers
99 views

Relation of geometric and polyhedral convergence

By Proposition 3.10(i) of Jorgensen and Marden's 1990 Algebraic and geometric convergence of Kleinian groups, "[A] sequence $\{G_n\}$ of Kleinian groups converges geometrically to a Kleinian ...
bergfalk's user avatar
10 votes
1 answer
706 views

Where to find English translation of Pansu's paper from Ann. Math?

Where can I find English translation of the following paper? P. Pansu, Métriques de Carnot-Carathéodory et quasiisométries des espaces symétriques de rang un. (French. English summary) [Carnot-...
Piotr Hajlasz's user avatar
1 vote
2 answers
158 views

Is the canonical map from isometry group of a Gromov hyperbolic space to homeomorphisms of its Gromov boundary injective?

Suppose X is a proper Gromov hyperbolic space and $\partial X$ is its Gromov boundary. It is well-known that there is a canonical group homomorphism $\Phi$ from the isometry group of X to the group ...
John Depp's user avatar
  • 331
5 votes
0 answers
75 views

Integral over quotient of discrete group

Let $Y$ be a proper metric space. By a lattice we mean a discontinuous group of isometries $\Gamma$ with compact quotient $Y/\Gamma$. You may also assume that $\Gamma$ acts freely. Suppose we are ...
user avatar
5 votes
0 answers
159 views

Is fundamental group of a finite volume, negatively curved, cusped manifold a non-uniform lattice?

$\DeclareMathOperator\Mob{Mob}$Some background: (1) A Riemannian manifold $M$ is pinched negatively curved if there is a constant $\tau<\kappa<0$ such that all the sectional curvatures are ...
Yanlong Hao's user avatar
5 votes
1 answer
242 views

Cancellation of elements in the Gromov boundary of a free group

Let $A$ be a finite set of free generators and their inverses and $F$ the free group generated by elements in $A$ (some call $A$ the alphabet of $F$). For each $g\in F$, use $\vert\,g\,\vert$ to ...
Sanae Kochiya's user avatar
5 votes
0 answers
270 views

Barycenter maps that are "submultiplicative" with respect to group actions

Background and notation For a set $X$, we denote $\mathcal{P} (X)$ to be the finitely supported measures on $X$, i.e., $\nu \in \mathcal{P} (X)$ is of the form $$\nu = \sum_{i=1}^n a_i \delta_{x_i},$...
Izhar Oppenheim's user avatar
3 votes
0 answers
95 views

Reference for Varopoulos isoperimetric inequality with multiplicity

The Varopoulos isoperimetric inequality for a bounded domain $D$ in a nilpotent group $\Gamma$ of growth $n$ reads $$ \# D \le \mathrm{const} \cdot (\#\partial D)^{n/(n-1)} $$ See Ch. 6.E+ in Gromov's ...
Kyle's user avatar
  • 243
1 vote
1 answer
221 views

What properties are preserved by quasi-isometries

Recently, I came across the notion of quasi-isometries, while thinking of "discrete spaces which are surrogates for approximate continuous ones". What (metric)/geometric properties are ...
ABIM's user avatar
  • 5,405
2 votes
0 answers
115 views

Definition of the category QMet of metric spaces and quasi-isometries

I am following Clara Löh's Geometric Group Theory. An Introduction, and in remark 5.1.12, she defines the category QMet whose objects are metric spaces and whose morphisms are quasi-isometric ...
Saúl RM's user avatar
  • 10.6k
3 votes
0 answers
98 views

Order type of monotone functions on $\Bbb N$ up to affine conjugation

Let's introduce order on non-strictly monotone functions $\Bbb N \to \Bbb N$ such that $f \leq g$ if $f(n) \leq Cg(Cn + C) + C$ and, of course, identify such $f, g$ if $f \leq g \leq f$. (Note absence ...
Denis T's user avatar
  • 4,600
4 votes
1 answer
120 views

Looking for a citation: the Rips $n$-complex of a $\delta$-hyperbolic group is contractible for high enough $n$

Given a $\delta$-hyperbolic group $G$, I have been told that the Rips $n$-complex of $G$ is contractible for high enough $n$. The only proof I have found for this statement is in an expository essay ...
Anschel Schaffer-Cohen's user avatar
1 vote
0 answers
238 views

Example of CAT($k$) space [closed]

Good time of day. I repeat the question from MSE (https://math.stackexchange.com/questions/4464888/question-about-example-of-catk-space) because no response has been received.Question is the following:...
UserIn's user avatar
  • 103
1 vote
0 answers
98 views

Question about coarse fixed point property in large-scale geometry

I read the article of Steven Hair "A degree-theoretic proof of a coarse fixed point principle". I have the following question. I start with some main definitions from this article. A coarse ...
UserIn's user avatar
  • 103
4 votes
0 answers
186 views

Ends of a negatively curved Riemannian manifold

Let $M$ be a complete Riemannian manifold. Let us use the standard definition of "end", for example, as in this article. If $M$ has non-negative Ricci curvature, it is well-known that it has ...
Math_Learner'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
4 votes
1 answer
158 views

Are geometric actions on CAT(0) spaces with isolated flats minimal on the boundary?

Suppose $X$ is a $CAT(0)$ space with isolated flats, $\partial X$ its visual boundary and $G$ acts properly discontinuously amd cocompactly on $X$. Must the $G$ action on $\partial X$ have a dense ...
Ilya Gekhtman's user avatar
14 votes
2 answers
1k views

Quasi-isometry groups of metric spaces

Given a metric space $(X, d)$, we can consider the set of all quasi-isometries $f: X \to X$, and quotient out by the equivalence relation identifying $f$ and $g$ if $\sup_{x \in X}d(f(x), g(x))$ is ...
ckefa's user avatar
  • 495
4 votes
1 answer
182 views

Electrifications of quasi-geodesics in relatively hyperbolic groups

This post is somewhat of a followup to my previous post here. $\DeclareMathOperator\Cay{Cay}$Suppose $G$ is a relatively hyperbolic group with peripheral subgroups $P_1,P_2,\dots, P_n$, and suppose $\...
luthien's user avatar
  • 421
4 votes
3 answers
376 views

Proof that lifts of geodesics are quasi-geodesics (relatively hyperbolic groups)

$\DeclareMathOperator\Cay{Cay}$Suppose $G$ is a relatively hyperbolic group with peripheral subgroups $P_1,P_2,\dots, P_n$, and suppose $\mathcal{S}$ is a finite generating set for $G$. Let $X=\Cay(G,\...
luthien's user avatar
  • 421
4 votes
1 answer
207 views

Reference for Chebyshev centers

Today, I came across the concept of Chebyshev center twice. In particular, it is the key tool in the very elegant paper "A fixed point theorem for $L^1$ spaces" by Bader, Gelander and Monod. ...
user982564's user avatar
5 votes
1 answer
483 views

Maximal symmetries of complete metrics on manifolds

Let $M$ be a connected and second-countable manifold, and $d,d'$ be $2$ complete compatible metrics on it. The isometry group of $(M,d)$, denoted as $\mathrm{Iso}(d)$, is equipped with the compact-...
Zerox's user avatar
  • 1,543
4 votes
0 answers
114 views

Sufficient conditions for the Besicovitch covering theorem to hold on groups of polynomial growth

Let $G$ be a finitely generated group with symmetric generating set $S$. Then $S$ induces a distance $d$ on $G$ by letting $d(a,b) = $ the minimum $n$ such that there are generators $s_1,...,s_n$ with ...
MathidRyan's user avatar
4 votes
1 answer
102 views

Shortcutting quasigeodesics

Let $\Gamma$ be a connected graph, let $\lambda \ge 1$ and $c \ge 0$ be some constants. Recall that a combinatorial path $p$ in $\Gamma$ is said to be $(\lambda,c)$-quasigeodesic if for every ...
Ashot Minasyan's user avatar
8 votes
0 answers
168 views

Do compact universal covers have concentration of measure phenomenon?

$\DeclareMathOperator\vol{vol}\DeclareMathOperator\diam{diam}$I have a sequence of compact Riemannian manifolds $M_n$ with $\diam (M_n) \to 0$ and finite fundamental groups $\pi_1 (M_n)$ so that their ...
Sergio Zamora's user avatar
35 votes
17 answers
3k views

Equivalent definitions of Gromov hyperbolicity

Let $X$ be a metric space. I'd like to collect as many definitions of Gromov hyperbolicity or $\delta$-hyperbolicity of $X$ as possible. I'm happy for the definitions to require some niceness ...
13 votes
2 answers
807 views

Prehistory of Gromov-hyperbolic spaces/groups

When speaking about hyperbolic groups/spaces, one usually refers to Gromov's monograph Hyperbolic groups for their introduction. However, coarse notions of hyperbolicity can be found in some of his ...
AGenevois's user avatar
  • 8,401
8 votes
1 answer
344 views

Characterizations of metric trees

Let $X$ be a geodesic space. Then the following conditions are equivalent: For any $x,y\in X, x \neq y$, there is a unique arc (homeomorphic to the interval $[0,1]$) with endpoints $x$ and $y$. No ...
Piotr Hajlasz's user avatar
7 votes
1 answer
283 views

Are two quasi-isometric, isomorphic on large enough balls, transitive graphs isomorphic?

Take two transitive graphs $X,Y$ (potentially directed and edge-labelled, e.g. Cayley graphs). Assume $X,Y$ are quasi-isometric with constant $K$, i.e. there exists a function $f:VX \to VY$ ($VX,\,VY$ ...
user148575's user avatar
5 votes
0 answers
155 views

Are there examples of hyperbolic manifolds with finite Bowen-Margulis measure and fundamental group which is not relatively hyperbolic?

It is well known that a geometrically finite hyperbolic manifold (quotient of $H^n$) has finite Bowen-Margulis measure. Marc Peigné [1] constructed examples of geometrically infinite hyperbolic ...
Ilya Gekhtman's user avatar
10 votes
1 answer
377 views

Translation lengths in CAT(0) spaces

Let $a,b$ be two loxodromic isometries of a CAT(0) space. Assume that, for every $n \geq 1$, $a^nb$ is also loxodromic. Is it possible for the translation length of $a^nb$ to be bounded independently ...
AGenevois's user avatar
  • 8,401
1 vote
1 answer
368 views

What is the symmetry group of this compound of two polytopes?

The geometric shape in question is a compound of two polytopes: an 11-hypercube with edge length $2$ and an 11-simplex with edge length $\sqrt6$ whose vertices are a subset of the hypercube’s. What is ...
Daniel Sebald's user avatar
8 votes
1 answer
516 views

An approach to showing hyperbolic groups are CAT(0)

I've been sitting on this idea for quite a while but I'm not in academia any longer so not likely to ever tackle it on my own. The approach is as follows: $G$ acts on its boundary $\partial G$ ergo, $...
BGroff's user avatar
  • 151
4 votes
0 answers
196 views

An analogue of the Milnor-Švarc lemma for Busemann boundaries

The Milnor-Švarc lemma, is, without doubt, regarded as one of the most important statements in geometric group theory. (Edit) One of the corollaries of this lemma says that if a hyperbolic group $G$ ...
Peter Kosenko's user avatar
5 votes
1 answer
200 views

Example of an invariant metric on a nilpotent group which is not asymptotically geodesic

Let $X$ be a metric space. We say that $X$ is asymptotically geodesic if for all $\epsilon > 0$, there exists $R > 0$ such that, for all $x,y \in X$, there exists some finite sequence of points $...
Christian Gorski's user avatar
10 votes
2 answers
550 views

Gromov hyperbolicity constant vs. Gromov-Hausdorff distance to a tree

Let $X$ be a compact, geodesic metric space which is Gromov hyperbolic with a constant $\delta>0$. To fix scaling, let us also assume that $X$ has diameter $1$. To fix a definition of Gromov ...
anon's user avatar
  • 101
6 votes
2 answers
575 views

Which groups are doubling?

A metric space $(M,d)$ is doubling if there exists $n$ such that every ball of radius $r$ can be covered by $n$ balls of radius $r/2$, for all $r$. For which f.g. groups $G$ and finite symmetric ...
Ville Salo's user avatar
  • 6,652
8 votes
2 answers
507 views

Contractible Rips complex from non-hyperbolic group

I heard that the Rips complexes associated to the Cayley graphs of hyperbolic groups are contractible for a sufficiently large radius. Is the converse true? Namely, if a group is non-hyperbolic, then ...
Uzu Lim's user avatar
  • 903
10 votes
0 answers
223 views

Does a rank 1 CAT(0) space with a proper cocompact group action contain a zero width axis?

A geodesic in a proper CAT(0) space is said to be rank 1 if it does not bound a flat half-plane and zero-width if it does not bound a flat strip of any width. Let $X$ be a geodesically complete CAT(0) ...
Yellow Pig's user avatar
  • 2,964