Questions tagged [gr.group-theory]
Questions about the branch of algebra that deals with groups.
6,115
questions
2
votes
0answers
25 views
Real non-principal 2-blocks for finite groups of Lie type
Is it true that each finite group of Lie type has a non-principal real $2$-block? Here the principal block is the one containing the trivial character and a block is real if it contains the complex ...
8
votes
1answer
142 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^...
0
votes
1answer
77 views
Isomorphism between two groups [closed]
Let $\mathbf{F}_q$ be finite field of order $q$, where $q$ is an odd-prime (or power of an odd prime). Is there an isomorphism between the following subgroups of unipotent $3\times 3$ matrices over $\...
-1
votes
0answers
65 views
What is the normal subgroup generated by nonsingular, positive definite matrices? [closed]
Within $GL(n,\mathbb C)$ let $H$ denote the normal subgroup generated by products of positive-definite, Hermitian matrices. What is this subgroup? And what is the quotient $GL(n,\mathbb C)/H$? Do ...
3
votes
1answer
63 views
Is the Singer cycle preserved by field automorphisms and graph automorphisms?
Let $T=\operatorname{PSL}_n(q)$ with $n$ a prime number. Then the $\mathscr{C}_3$ subgroup $M=\langle x\rangle{:}\langle\sigma\rangle$ of $T$ is isomorphic to $\mathbb{Z}_{\frac{q^n-1}{(q-1)(n,q-1)}}{:...
4
votes
0answers
56 views
Maximal $\mathbb{Q}$-split torus in center of Weil restriction of $\text{GL}_n$ over a number ring
I'm a topologist writing a paper where I have to do a bit of work with algebraic groups, and I've managed to confuse myself about something very basic.
Let $K$ be an algebraic number field. Regard $\...
0
votes
0answers
57 views
Large gaps in the norm of a subgroup and its centraliser
Take an infinite finitely generated group $G$ with an infinite subgroup $N$ which has an infinite centraliser $Z = Z_G(N)$.
Let $S$ be some [symmetric] generating set of $G$ and for $g \in G$,
...
6
votes
2answers
105 views
Minimal generation of simple groups and Ore's conjecture
The well known Ore's conjecture (now established) states that every element of a finite non-abelian simple group $G$ is a commutator of a pair of elements. Also we know that $G$ is $2$-generated.
I ...
4
votes
0answers
153 views
Image of the mapping class group of surfaces into automorphism group?
Let $S_{g,p}^n$ be a compact oriented surface of genus $g$ with $p$ punctures and $n$ boundary components, and $\operatorname{Mod}(S)$ and $\operatorname{PMod}(S)$ be the mapping class group and the ...
1
vote
0answers
79 views
$G/F(G)$ is isomorphic to $X_1\times\cdots\times X_t$
I asked this question on math.stackexchange many hours ago, but haven’t got an answer. It was mentioned in a comment that the answer to my question is trivial, but I couldn’t see why.
$G$ is a finite ...
1
vote
1answer
72 views
Is the solvable radical of a finite perfect group contained in the Schur multiplier of the quotient of the group modulo the solvable radical?
Let $G$ be a finite perfect group, and let $N$ be the solvable radical
of $G$. If $G/N$ is a non-abelian simple group, then is it true that $N$
is contained in the Schur multiplier of $G/N$?
If this ...
0
votes
0answers
61 views
QI-closure of $\mathrm{NA}\times\mathrm{NA}$
Suppose we know the following about a class of groups $\mathcal{G}$.
If $G$, $H$ are f.g. r.p. nonamenable groups, then $G \times H \in \mathcal{G}$.
If $G \in \mathcal{G}$, $G$ is f.p., and $G$ is ...
5
votes
1answer
164 views
Finite group ${\rm Sp}_4({\Bbb F}_3)$: involutions coming from a 4-dimensional complex representation
I am interested in the finite unitary reflection group $G= G_{32}$, the group No. 32 in Table VII on page 301 of the paper:
Shephard, G. C.; Todd, J., A. Finite unitary reflection groups. Canad. J. ...
4
votes
1answer
114 views
Properties of the spectrum of the Koopman representation
Let $G$ be a discrete countable infinite group acting on a compact metric space $X$ via homeomorphisms preserving a probability measure $\mu$.
A function $\lambda\colon G\to \mathbb C$ is an ...
6
votes
2answers
309 views
Representation of central extension
Let $G$ be a finite abelian group of rank $n$ and $H\rightarrow G$ a central extension with cyclic finite kernel.
Is it true that we can find a faithful representation $H\rightarrow {\rm GL}_{k(n)}(\...
8
votes
0answers
126 views
Reference request: Name or use of this group of diffeomorphisms of the disc
Let $k \in \{0,\infty\}$, $G\subseteq \operatorname{Diff}^k(D^n)$ be the set of diffeomorphisms $\phi:D^n\to D^n$ of the closed $n$-disc $D^n$ (with its boundary) satisfying the following:
$
\phi(S_r^...
3
votes
0answers
90 views
Are there perfect DTI-groups which are not simple?
Recall that a subgroup $H$ of a group $G$ is called a TI-subgroup
if for every $g \in G$ it is $H \cap H^g \in \{1,H\}$.
We say that a group $G$ is a DTI-group if the derived subgroups of all
of its ...
1
vote
0answers
112 views
What can we get from an automorphism of order $2$
An automorphism of order $2$ is an automorphism fixes some elements and inverts the others.
It’s well known that not all groups have automorphisms of order $2$, $C_2$, for example.
But if a group ...
3
votes
0answers
144 views
Convergence of Fuchsian groups and existence of suitable homeomorphisms
Let $(\Gamma_n)_n$ ($\subset PSL(2,\mathbb{R})$) be a sequence of discrete groups, if we say that $(\Gamma_n)_n$ converges to a group $\Gamma$ this means that there exist isomorphisms $\tau_n:\Gamma\...
4
votes
0answers
109 views
Number of elements in $\mathrm{GL}(n,p)$ with maximal order
I learned reading this question that $\mathrm{GL}(n,p)$ elements have at most a multiplicative order of $p^n -1$.
I would like to know how many matrices have an order of exactly $p^n -1$. Do they ...
3
votes
0answers
78 views
Residually amenable groups
I have two questions about residually amenable groups:
Is every finitely presented amenable group residually elementary amenable?
Is the free Burnside group on two generators residually amenable?
...
6
votes
1answer
398 views
Origin of the term 'index of a subgroup'
The index of a subgroup $H$ in a group $G$ is the number of distinct cosets of $H$ in $G$.
Why did someone decide to call this an 'index'? What's the rationale for this?
8
votes
1answer
335 views
Conjecture by Ekedahl on Weyl groups and Abelian varieties
A conjecture was made on p.14 in "Cycle Classes of the E-O Stratification on the Moduli of Abelian Varieties" by Torsten Ekedahl (late, excellent contributor to MO) and Gerard Van Der Geer concerning ...
8
votes
0answers
117 views
Membership problem in general linear group
This is surely a very well known problem, but I could not find an answer on MO or on Google, so here I am.
Given some finitely generated free subgroup $H$ of $\operatorname{GL}_n(\mathbb{Z}[t,t^{-1}])...
2
votes
1answer
85 views
Centralizer of a single element in the monoid of self-maps of a set
This is a follow-up to this question: For what sets $X$ do there exist a pair of functions from $X$ to $X$ with the identity being the only function that commutes with both?
Let $X$ be a set, and $X^...
0
votes
0answers
60 views
Fitting subgroup of a solvable group is a direct product of some elementary abelian $p$-groups
I saw a remark saying
If $G$ is solvable, then ${\rm Out}(F(G))$ is isomorphic to a direct product of ${\rm GL}(n_i,p_i)$ (except for certain value of $n_i$ and $p_i$).
I know the key is to prove ...
2
votes
2answers
56 views
Upper density of subsets of an amenable group
Let $G$ be an amenable group (so locally compact Hausdorff) and also assume it is second countable if needed. My question is that what are the standard ways (across literature) of defining the upper ...
1
vote
1answer
219 views
injectivity of pushout?
We have the following pushout diagram:
$$\begin{array}{ccc} \langle X, Y \rangle & \xrightarrow{\alpha} & \mathbb{Z}_a \ast \mathbb{Z}_b \ast \mathbb{Z}_c \ast \mathbb{Z}_d \\ \downarrow \...
10
votes
0answers
178 views
Roadmap to homotopical group theory
I have been lurking here for a long time just enjoying the scenery from my beginner's viewpoint. I have a math.SE account but I think this question is appropriate here based on the nature of the ...
2
votes
0answers
65 views
Finitely generated uniformly amenable groups
Keller in "Amenable groups and varieties of groups" introduces uniformly amenable groups as groups such that
there is a function $a: ]0,1[ \times \mathbb{N} \to \mathbb{N}$ such that
for any finite ...
0
votes
0answers
36 views
Intersection of subgroup of a free group with the lower central series
If I have a subgroup $S$ of a free group $\mathcal{F}_m$, what can I say about the behaviour of the descending sequence of subgroups
$\left< S, \Gamma_c(\mathcal{F}_m) \right>$ (where $\Gamma_c(\...
2
votes
0answers
40 views
Can a polytope with vertex-transitive edge graph or face lattice be made vertex-transitive?
Let $P\subset\Bbb R^d$ be a convex, full-dimensional polytope (convex hull of finitely many points, affine hull is the whole space), $G_P$ its edge graph and $\mathcal F_P$ its face lattice. Any of ...
3
votes
1answer
74 views
Graph structure on $S_\omega$ induced by fixed points on compositions
Let $S_\omega$ denote the collection of bijections $f:\omega\to\omega$. We say that $f \in S_\omega$ has a fixed point if there is $x\in \omega$ with $f(x) = x$.
It is a short exercise to show that ...
11
votes
0answers
308 views
Isomorphic free groups have bijective generating sets
Let $F(X)$ be the free group on a set $X$. Classically, we can prove the statement:
$F(X) \cong F(Y)$ if and only if $|X|=|Y|$.
The proofs (that I have seen) consist of turning the group ...
2
votes
1answer
200 views
Why $G/F(G)$ is isomorphic to a subgroup of ${\rm Out}(F(G))$?
I know two facts and I’ve managed to figure out how to prove one, but the other one is still a little confusing.
Let $G$ be a finite solvable group and $F(G)$ is the Fitting subgroup of $G$.
(...
4
votes
1answer
133 views
Finitely presented non-residually amenable groups without free subgroups
Does there exist a finitely presented group that does not contain a nonabelian free group and is not residually amenable?
5
votes
2answers
168 views
Seeking to understand meaning of “von Neumann spectrum” in a paper of Bader–Furman–Shaker
In attempting to understand the paper "Superrigidity, Weyl groups, and actions on the circle" of Uri Bader, Alex Furman and Ali Shaker (linked at Furman's page)
I find that towards the end of the ...
6
votes
1answer
154 views
Why do we say the Fitting subgroup/generalized Fitting subgroup control the structure of a group?
I’m learning the Fitting subgroup these days. I’m interested in this topic and particularly in the role that it plays in the structure of groups. Many people on MSE mentioned that the Fitting subgroup/...
1
vote
1answer
66 views
Ergodic decomposition - how does restricting measure effect it? (Choquet Theory)
Suppose that $G$ is a discrete countable group and $\mu$ is an IRS (invariant random subgroup) of $G$: $\mu$ is conjugation invariant as a probability measure on the subgroups of $G$.
Since all the $...
12
votes
1answer
192 views
Powers of the Euler class, torsion free subgroup of Homeo($S^1$)
For any subgroup $G$ of $\text{Homeo}(S^1)$, we have the Euler class $\chi$ in the group cohomology $H^2(G;\mathbb{Z})$. One can think of this class as the pullback of the generator of $H^2(\mathrm{B}\...
3
votes
1answer
114 views
action of symmetric group on the second exterior power
Let $e_i \wedge e_j \ (i < j)$ be a basis for the $\mathbb Z$-module $\wedge^2 \Gamma$, where $\Gamma = \mathbb Z^n$.
Clearly $S_n$ acts on the module $\wedge^2 \Gamma$ via
$$\pi(e_i \wedge e_j) ...
5
votes
1answer
105 views
Comparing $X+Y$ and $X-Y$ for independent random variables with values in an abelian locally compact group
Let $G$ be an abelian locally (separable?) compact group with Haar measure $\mu$. Inspired by the interesting proof of A sum of two binomial random variables :
Let $X$ and $Y$ be $G$-valued ...
0
votes
0answers
49 views
Schur multiplier of 2-Sylow subgroups of symmetric group
Is the Schur multiplier of 2-Sylow subgroups of symmetric groups on $n\geq 4$ symbols known?
I couldn’t find much except that multiplier of $S_n$ is contained in the multiplier of 2-Sylow subgroup.
0
votes
1answer
149 views
Conjugacy in the quaternion group
Let $G$ be a non-commutative group, and suppose we are given two elements $x, y \in G$ which are conjugate, i.e. we know there exists some $z \in G$ such that $zxz^{-1} = y$. Can we find $z$ given $x$ ...
3
votes
1answer
163 views
Groups whose non-linear irreducible characters are all non-faithful
I am interested in knowing if there is any literature that describes finite solvable groups whose non-linear complex irreducible characters are all non-faithful.
7
votes
2answers
163 views
Torsion group with finitely many elements of order 2 but infinitely many elements of order 4
Does there exists a group $G$ satisfying all the following conditions?
$G$ is finitely generated,
$G$ is of bounded torsion (has finite exponent),
$G$ has finitely many elements of order $2$,
$G$ has ...
2
votes
1answer
202 views
Recurrence relation for number of reduced words of longest element in $S_n$
Is there any recurrence relation known for the number of reduced words of the longest element in $S_n$ (not commutation classes)?
Edit: Sorry for unaccepting the answer, but I realized that I really ...
20
votes
1answer
594 views
Is $A_5$ the only finite simple group with only 4 distinct sizes of orbits under the action of the automorphism group?
Given a finite group $G$, let $\eta(G)$ denote the number of distinct
sizes of orbits on $G$ under the action of ${\rm Aut}(G)$.
It happens that there are infinitely many non-abelian finite simple ...
3
votes
0answers
153 views
Hypothesis: An injection from polygons into $SO(2) \times S_n$
I have stumbled upon a possible representation of polygons by a concise description of their behaviour under rotation. I would like to know more about it and, obviously, if it is actually a bijection. ...
0
votes
0answers
70 views
What do Sylow 2-subgroups look like for Schur covering groups of finite simple groups?
What do Sylow 2-subgroups look like for Schur covering groups of finite simple groups?
Are there any references in which we can find the stucture of Sylow 2-subgroups of Schur covering groups of ...
