Fixed-point subgroup

In algebra, the fixed-point subgroup $G^f$ of an automorphism f of a group G is the subgroup of G:

G^f = \{ g \in G \mid f(g) = g \}.

More generally, if S is a set of automorphisms of G (i.e., a subset of th automorphism group of G), then the set of the elements of G that are left fixed by every automorphism in S is a subgroup of G, denoted by G^S.

For example, take G to be the group of invertible n-by-n real matrices and $f(g)=(g^T)^{-1}$ (called the Cartan involution). Then $G^f$ is the group $O(n)$ of n-by-n orthogonal matrices.

To give an abstract example, let S be a subset of a group G. Then each element of S can be thought of as an automorphism through conjugation. Then

G^S = \{ g \in G | sgs^{-1} = g \}

;

that is, the centralizer of S.

References

This article is issued from Wikipedia - version of the Saturday, September 26, 2015. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.