Finite NPC theorem

Statement

Suppose $G$ is a finite group and $H$ is a normal subgroup of $G$ . Then, there exists a finite group $K$ containing $G$ such that $H$ is a characteristic subgroup of $K$ .

Related facts

Related facts about potentially characteristic subgroups with similar proofs

Normal equals potentially characteristic: The general version of the result.
Finite NIPC theorem: An analogous results for quotients/images (finite group version).
Normal equals image-potentially characteristic: An analogous results for quotients/images (general version).

Other related facts about potentially characteristic subgroups

Central implies potentially verbal in finite

Analogous facts for image-potentially characteristic subgroups

Finite NIPC theorem: Analogous statement for images; the proof uses the same construction.

Breakdown of stronger facts

Normal not implies normal-extensible automorphism-invariant in finite
Normal not implies normal-potentially characteristic: If $H$ is a normal subgroup of a finite group $G$ , it is not necessary that there exists a group $K$ containing $G$ as a normal subgroup and $H$ as a characteristic subgroup.

Facts used

Proof

Given: A finite group $G$ , a normal subgroup $H$ of $G$ .

To prove: There exists a group $K$ containing $G$ such that $H$ is characteristic in $K$ .

Proof:

Let $L = G / H$ . Suppose $p$ is a prime not dividing the order of $G$ . By fact (1), $L$ is a subgroup of the symmetric group $S y m (L)$ , which in turn can be embedded in the general linear group $G L (n, p)$ where $n = | L |$ . Thus, $L$ has a faithful representation on a vector space $V$ of dimension $n$ over the prime field of order $p$ .
Since $L = G / H$ , a faithful representation of $L$ on $V$ gives a representation of $G$ on $V$ whose kernel is $H$ . Let $K$ be the semidirect product $V ⋊ G$ for this action. We can also think of $K$ as a wreath product of the group of prime order $p$ by $G$ for this action.
$V$ is characteristic in $K$ : In fact, $V$ is a normal $p$ -Sylow subgroup, and hence is characteristic (fact (2)) (it can be defined as the set of all elements whose order is a power of $p$ ).
$C_{K} (V)$ is characteristic in $K$ : This follows from the previous step and fact (3).
$C_{K} (V) = V \times H$ : Since $V$ is abelian, the quotient group $K / V ≅ G$ acts on $V$ (fact (4)); in particular, any two elements in the same coset of $V$ have the same action by conjugation on $V$ . Thus, the centralizer of $V$ comprises those cosets of $V$ for which the corresponding element of $G$ fixes $V$ . This is precisely the cosets of elements of $H$ . Thus, $C_{K} (V) = V ⋊ H$ . Since the action is trivial, $C_{K} (V) = V \times H$ .
$H$ is characteristic in $V \times H$ : $H$ is a normal subgroup of $V \times H$ , on account of being a direct factor. Further, it is a normal $p^{'}$ -Hall subgroup, so by fact (2), it is characteristic in $V \times H$ .
$H$ is characteristic in $K$ : By steps (4) and (5), $V \times H$ is characteristic in $K$ , and by step (6), $H$ is characteristic in $V \times H$ . Thus, by fact (5), $H$ is characteristic in $K$ .