Symmetric groups are almost simple

This article gives the statement, and possibly proof, of a particular group or type of group (namely, Symmetric group (?)) satisfying a particular group property (namely, Almost simple group (?)).

Statement

For finite sets

Let ${\displaystyle S}$ be a finite set of size at least five. Then the symmetric group on ${\displaystyle S}$ is an almost simple group.

For infinite sets

Let ${\displaystyle S}$ be an infinite set. Then, both the finitary symmetric group on ${\displaystyle S}$ and the whole symmetric group on ${\displaystyle S}$ are almost simple groups.

Definitions used

Almost simple group

A group ${\displaystyle G}$ is termed an almost simple group if ${\displaystyle G}$ has a normal subgroup ${\displaystyle N}$ such that ${\displaystyle N}$ is a simple non-Abelian group and is centralizer-free in ${\displaystyle G}$.

Facts used

1. Alternating group is normal in symmetric group
2. Alternating groups are simple: The alternating group on ${\displaystyle n}$ letters, for ${\displaystyle n\geq 5}$, is a simple group.
3. Finitary alternating group is centralizer-free in symmetric group

Proof

For finite sets

For ${\displaystyle n\geq 5}$, let ${\displaystyle G=S_{n}}$ and ${\displaystyle N=A_{n}}$ be the subgroup comprising the even permutations, i.e., the alternating group. Then, we have:

• ${\displaystyle N}$ is normal in ${\displaystyle G}$ (by fact (1)).
• ${\displaystyle N}$ is simple and non-Abelian (by fact (2)).
• ${\displaystyle N}$ is centralizer-free (By fact (3)).

Thus, ${\displaystyle G}$ is an almost simple group.