Maschke's averaging lemma for abelian groups

Statement

Suppose ${\displaystyle G}$ is a finite group and ${\displaystyle V}$ is an Abelian group such that the order of ${\displaystyle G}$ is invertible in ${\displaystyle V}$ (in other words, the map ${\displaystyle v\mapsto \left|G\right|v}$ is bijective).

Suppose we have an action of ${\displaystyle G}$ on ${\displaystyle V}$ by automorphisms. Then, if ${\displaystyle W}$ is a direct factor of ${\displaystyle V}$ that is invariant under the ${\displaystyle G}$-action, there exists a complement ${\displaystyle W^{\prime }}$ to ${\displaystyle W}$ in ${\displaystyle V}$ that is also invariant under the ${\displaystyle G}$-action.

In the particular case where ${\displaystyle V}$ is elementary Abelian, we get the usual Maschke's lemma for prime fields.

Related facts

• Maschke's averaging lemma: Here, the Abelian group is the additive group of a field whose characteristic does not divide the order of the group. The condition on the characteristic of the field.

Proof

Given:

References

Textbook references

• Finite Groups by Daniel Gorenstein, ISBN 0821843427, ^{More info}, Page 69, Theorem 3.2