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This tag is used if a reference is needed in a paper or textbook on a specific result.
2
votes
1
answer
273
views
virtual chain conditions in groups
In group theory, it's often very useful to know whether a family of subgroups (eg normal subgroups, Zariski-closed subgroups, ...) satisfies an ascending chain condition or a descending chain conditio …
3
votes
0
answers
154
views
A variant on the Higman-Thompson groups
Let $C = \mathbb{Z}/d\mathbb{Z}$ ($d \ge 0$).
Let $D = \langle a_c : c \in C, t \mid a^2_c = t^d = 1, ta_ct^{-1} = a_{c+1} \rangle$.
let $E$ be the subgroup generated by $\{a_c : c \in C\}$ and let …
2
votes
1
answer
184
views
Kurosh radical theory for topological groups?
Does anyone know if there has been much work done on radical and semisimple classes in the sense of Kurosh within the category of topological groups (or subcategories thereof)? For instance, for a ra …
0
votes
What are the best settings for the large scale geometry of locally compact groups?
This question has already been answered, but I thought it would be a good idea to draw attention to some things that have appeared since the question was asked:
There is an upcoming book by Yves de …
1
vote
Continuity of conjugation actions of Polish groups
OK, here is an attempted answer under the assumption that $G$ is locally compact, which can perhaps be refined to give a general answer for Polish groups. A good reference would still be appreciated …
3
votes
Lattices in general totally disconnected locally compact groups
It's quite a specific family of examples, but you might find this paper of interest as an example of how a compactly generated simple t.d.l.c. group can fail to have any lattices:
Bader, Caprace, Gel …
9
votes
0
answers
329
views
'Infinitesimal' elements of a topological group
Let $G$ be a topological group, and let $M$ be the intersection of all conjugacy-invariant neighbourhoods of the identity in $G$ (in other words, the set of elements that can be taken arbitarily close …
5
votes
0
answers
107
views
A dynamical property of automorphisms of a locally compact group
Let $G$ be a Hausdorff locally compact group and let $\alpha$ be an automorphism of $G$. Say $\alpha$ is (forwards) topologically recurrent if for all $g \in G$ and all neighbourhoods $O$ of $g$, the …
3
votes
0
answers
142
views
Infinitely generated powerful pro-$p$ groups
A pro-$p$ group of finite subgroup rank has an open subgroup $P$ that is uniformly powerful, meaning that $[P,P]$ is contained in the group generated by $2p$-th powers in $P$, and raising elements to …
5
votes
1
answer
170
views
Equations and random subgroups in compact groups
EDIT: Here is a more specific question.
Let $G$ be a compact group and let $w$ be a word in $d$ variables. Then the solution set $S$ of the equation of $w=1$ is a closed subset of the product $G^d$ …
6
votes
1
answer
142
views
Continuity of conjugation actions of Polish groups
Let $G$ and $H$ be Polish groups and let $\psi: G \rightarrow H$ be a continuous injective homomorphism such that $\psi(G)$ is normal in $H$. Then $H$ acts on $G$ by conjugation via $\psi$, in other …
4
votes
3
answers
394
views
A characterisation of Boolean algebras
Let $M$ be a meet-semilattice with a least element $0$. Suppose there is an order-reversing involution $a \mapsto -a$ on $M$ such that for all $a, b \in M$, $a \wedge b = 0$ if and only if $b \le -a$ …
4
votes
0
answers
87
views
Is there a name for this kind of structure? (Not quite a lattice-ordered group)
I'm looking at a certain class of groups $G$ that come with a partial order $\le$ on the elements. So far it looks like $(G,\le)$ has the following properties:
The partial order is invariant under …
0
votes
0
answers
74
views
The set of (property) elements of a locally compact group is closed
For which properties $(P)$ is the following statement known to be true?
In any locally compact group $G$, the elements of $G$ that satisfy $(P)$ form a closed subset of $G$. In other words, the limi …
5
votes
1
answer
161
views
Characteristically simple locally compact abelian groups
Say a topological group $G$ is topologically characteristically simple if there does not exist a closed subgroup $1 < K < G$ such that $K$ is invariant under all automorphisms of $G$ (here `automorphi …