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Questions about the branch of algebra that deals with groups.

3 votes
Accepted

$p$-adic analytic pro-$p$ group satisfies a pro-$p$ identity?

The question is closely related to that of the linearity (via continuous representations) of the free pro-$p$ group $F_r$ aver pro-$p$ rings. Using the universal property of the $\mathbb{Z}_p$-algeb …
Yassine Guerboussa's user avatar
1 vote

The rank of indecomposable finite abelian 2-group

No, the rank of $G$ could be arbitrary large. Here is a counter-example that works for all primes $p$. Fix a positive integer $n$, and let $G$ be the direct sum of $n$ copies of $\mathbb{Z}/p^2\mathb …
Yassine Guerboussa's user avatar
6 votes
Accepted

Finite $p$-groups of maximal class whose generators have order $p$

The classification of such groups is as difficult as the classification of all $p$-groups of maximal class. Note that, for the latter problem, beside the cases where $p=2,3$ that were settled by Blac …
Yassine Guerboussa's user avatar
2 votes
0 answers
147 views

Cohomologically trivial modules over finite $p$-groups

Let $A$ be a finitely generated $\mathbb{Z}_pG$-module, where $G$ is a finite $p$-group and $\mathbb{Z}_p$ is the ring of $p$-adic integers; assume moreover that $A$ is cohomologically trivial, that i …
Yassine Guerboussa's user avatar
5 votes
1 answer
226 views

Generalized identities of (soluble) groups

Let $G$ be a group. Let us say that $G$ satisfies a generalized identity of degree $n$ if there exist $a_1,a_2,\dots a_n \in G$ such that $$x^{a_1}x^{a_2}\dots x^{a_n}=1,$$ for all $x\in G$. Assum …
Yassine Guerboussa's user avatar
2 votes

Torsion in profinite groups

Too long for a comment. I note first that I made an attempt to reduce the problem to the case where $K$ is normal, but it turned out to be false; I'm thankful to Ian Agol for his discussion. The cas …
Yassine Guerboussa's user avatar
0 votes
1 answer
321 views

A question on direct limits of finite $p$-groups

Where can we find a well developed material on direct limits of finite $p$-groups? For instance, is there a characterization of such groups, which have a finite rank (that is every subgroup can be ge …
Yassine Guerboussa's user avatar
2 votes
1 answer
105 views

A characterization of almost relatively free, finite $p$-groups

Let $G$ be a finite minimally $d$-generated $p$-group. If $G$ is relatively free, that is $G$ is a quotient of the free group $F$ on $d$ generators by a fully invariant subgroup of $F$, then the orde …
Yassine Guerboussa's user avatar
4 votes
2 answers
646 views

A question on $p$-central $p$-groups

Let $p$ be a fixed prime. A group $G$ is termed $p$-central if every element of order $p$ in $G$ lies in the center. Having a finite $p$-group $G$ of rank $k$ (the least integer, such that every sub …
Yassine Guerboussa's user avatar
4 votes

Bound for the Frattini subgroup of a $p$-group

For your second question the answer is yes. The bound follows from Schreier's inequality: if $\Phi(G)$ has index $p^d$, then it follows that $\Phi(G)$ can be generated by $p^d(d-1)+1$ elements. Note …
Yassine Guerboussa's user avatar
2 votes
0 answers
201 views

Two $p$-groups whose automorphism groups have isomorphic Sylow $p$-subgroups

Fix a prime $p$, and let $M$ be the unique nonabelian group of order $p^3$ and exponent $p$. Let us denote by $E_n$ the elementary abelian group of rank $n$. Is it true that $\operatorname{Aut}(M …
Yassine Guerboussa's user avatar
3 votes

Index of agemo subgroups in $p$-groups

This answer is based on Holt's counter example. In a $p$-group of maximal class $G$, it is known that: $|G:G^p|=p^p$ and $\Omega_1(G)$ has either order $p^{p-1}$ or index $p$. Now we take $G$ of ma …
Yassine Guerboussa's user avatar
4 votes
2 answers
430 views

Index of agemo subgroups in $p$-groups

Having a finite $p$-group $G$ ($p$ odd). we denote by $\Omega_1(G)$ the subgroup generated by all the elements of $G$ of order dividing $p$. Is there an example of such a group $G$, such that $|G: …
Yassine Guerboussa's user avatar
1 vote
1 answer
306 views

A finite $p$-group with certain properties

Is there a finite $p$-group $G$ such that : (a) $G= \langle A,x,y \rangle$, with $G/Z(G)$ has exponent $p$, $A$ is a maximal abelian normal subgroup of $G$, and $G/A$ has order $p^2$ (thus it is elem …
Yassine Guerboussa's user avatar
2 votes
0 answers
129 views

Non left $k$-Engel elements in a nilpoent group always generate this group

Given a finite nilpotent group $G$ and let us denote by $L_n(G)$ the set of left $n$-Engel elements in $G$. Assume that $n$ is the smallest positive integer such that $L_n(G)=G$. Is it true that $G$ …
Yassine Guerboussa's user avatar

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