Weyl group

Definition

Definition with symbols

Let ${\displaystyle H\leq G}$ be groups. The Weyl group of ${\displaystyle H}$ with respect to ${\displaystyle G}$ can be defined in the following equivalent ways:

• It is the group of those automorphisms of ${\displaystyle H}$ which extend to inner automorphisms of ${\displaystyle G}$
• It is the quotient group ${\displaystyle N_{G}(H)/C_{G}(H)}$ where ${\displaystyle N_{G}(H)}$ is the normalizer of ${\displaystyle H}$ in ${\displaystyle G}$ and ${\displaystyle C_{G}(H)}$ is the centralizer of ${\displaystyle H}$ in ${\displaystyle G}$.
• it is the image of the natural homomorphism from ${\displaystyle N_{G}(H)}$ to ${\displaystyle \operatorname {Aut} (H)}$ that sends ${\displaystyle g\in N_{G}(H)}$ to the automorphism of ${\displaystyle H}$ given via conjugation by ${\displaystyle g}$.

Related notions

Relation with subgroup properties

The Weyl group always contains the inner automorphism group of ${\displaystyle H}$ and lies inside the automorphism group of ${\displaystyle H}$. This gives two extreme subgroup properties:

• Fully normalized subgroup is a subgroup whose Weyl group is the whole automorphism group
• Central factor of normalizer is a subgroup whose Weyl group is precisely the inner automorphism group

For self-centralizing Abelian subgroups

In the particular case where ${\displaystyle H=C_{G}(H)}$, the Weyl group of ${\displaystyle H}$ is simply ${\displaystyle N_{G}(H)/H}$. This situation is quite common in the case of linear groups, for instance: each torus (for instance, the subgroup of invertible diagonal matrices) is self-centralizing in the general linear group, and hence its Weyl group is simply the quotient of its normalizer, by itself (this turns out to be the symmetric group).