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Questions about the branch of algebra that deals with groups.

33 votes
4 answers
10k views

Groups with all subgroups normal

Is there any sort of classification of (say finite) groups with the property that every subgroup is normal? Of course, any abelian group has this property, but the quaternions show commutativity isn' …
1 vote
Accepted

Example involving partially ordered Abelian groups

Let $G=\mathbb{R}^2$ with order defined by $(a_1,a_2)\leq (b_1,b_2) \iff a_1\leq b_1$ and $a_2\leq b_2$. Let $u=(1,1)$ and let $g_0=(1,2)$. Then $p(g_0)=1$ and $r(g_0)=2$.
Kevin Ventullo's user avatar
4 votes
Accepted

About normal closure of cyclic subgroup

No. Consider the semi-direct product $(\mathbf{Z}\times \mathbf{Z}/2)\rtimes \mathbf{Z}/2$, where the rightmost factor acts by $(1,0)\mapsto (1,1)$ and fixes $(0,1)$. Then the normal closure of $\math …
Kevin Ventullo's user avatar
3 votes

Molien for modular representations?

By a well known lemma in group theory, we can write any $g\in G$ uniquely as $h_1h_2$ where $h_1$ has order a power of $p$, $h_2$ has order prime to $p$, and $h_1h_2=h_2h_1$. Thus we may write $G$ as …
Kevin Ventullo's user avatar