Alternating group

of degree $n$

The subgroup $A_{n}$ of the symmetric group $S_{n}$ consisting of all even permutations. $A_{n}$ is a normal subgroup in $S_{n}$ of index 2 and order $n! / 2$ . The permutations of $A_{n}$ , considered as permutations of the indices of variables $x_{1}, \dots, x_{n}$ , leave the alternating polynomial $\prod (x_{i} - x_{j})$ invariant, hence the term "alternating group". The group $A_{m}$ may also be defined for infinite cardinal numbers $m$ , as the subgroup of $S_{m}$ consisting of all even permutations. If $n > 3$ , the group $A_{n}$ is $(n - 2)$ -fold transitive. For any $n$ , finite or infinite, except $n = 4$ , this group is simple; this fact plays an important role in the theory of solvability of algebraic equations by radicals.

Comments[edit]

Note that $A_{5}$ is the non-Abelian simple group of smallest possible order.

References[edit]

[1] M. Hall, "Group theory" , Macmillan (1959) Zbl 0084.02202