Proving that something equals the commutator subgroup and conjugacy classes/normal subgroups

Question

I've learned that the commutator subgroup is generated by the commutators. Now this says little about its elements (to me) because I don't see how they need to be commutators themselves. I'm interested in what these commutators look like in general (maybe an intuitive idea). And what some easy ways of proving that something equals a commutator subgroup.

I'm also quite confused about the difference of normal subgroups and conjugacy classes. I've read that normal subgroups are usually the 'union' of conjugacy classes, however.. Can't we construct normal subgroups then by taking individual conjugacy classes?

Answer 1

The commutator subgroup of a group $G$ enjoys the property of being the smallest normal subgroup of $G$ with abelian quotient. This often helps when you are trying to find the commutator subgroup of a given group. For example, if you can get your hands on all the normal subgroups, you can go calculating quotient groups, starting with the smallest normal subgroup, and as soon as you hit one with abelian quotient, you win. Or, you can calculate a few commutators, work out the subgroup $H$ they generate, find the smallest normal subgroup containing $H$, and see whether $G/H$ is abelian. What exactly works best will depend on $G$.

If $N$ is normal in $G$, then $N$ must be a union of conjugacy classes. But not every union of conjugacy classes is a normal subgroup, simply because not every union of conjugacy classes is a subgroup. If a union of conjugacy classes is a subgroup, then it is a normal subgroup.