An
invertible matrix A is a generalized permutation matrix
if and only if it can be written as a product of an invertible
diagonal matrix D and an (implicitly
invertible)
permutation matrix P: i.e., :A = DP.
Group structure The
set of
n ×
n generalized permutation matrices with entries in a
field F forms a
subgroup of the
general linear group GL(
n,
F), in which the group of
nonsingular diagonal matrices Δ(
n,
F) forms a
normal subgroup. Indeed, over all fields except
GF(2), the generalized permutation matrices are the
normalizer of the diagonal matrices, meaning that the generalized permutation matrices are the
largest subgroup of GL(
n,
F) in which diagonal matrices are normal. The abstract group of generalized permutation matrices is the
wreath product of
F× and
Sn. Concretely, this means that it is the
semidirect product of Δ(
n,
F) by the
symmetric group Sn: :
Sn ⋉ Δ(
n,
F), where
Sn acts by permuting coordinates and the diagonal matrices Δ(
n,
F) are
isomorphic to the
n-fold product (
F×)
n. To be precise, the generalized permutation matrices are a (faithful)
linear representation of this abstract wreath product: a realization of the abstract group as a subgroup of matrices.
Subgroups • The subgroup where all entries are 1 is exactly the
permutation matrices, which is isomorphic to the symmetric group. • The subgroup where all entries are ±1 is the
signed permutation matrices, which is the
hyperoctahedral group. • The subgroup where the entries are
mth
roots of unity \mu_m is isomorphic to a
generalized symmetric group. • The subgroup of diagonal matrices is
abelian, normal, and a maximal abelian subgroup. The
quotient group is the symmetric group, and this construction is in fact the
Weyl group of the general linear group: the diagonal matrices are a
maximal torus in the general linear group (and are their own
centralizer), the generalized permutation matrices are the normalizer of this torus, and the quotient, N(T)/Z(T) = N(T)/T \cong S_n is the Weyl group. == Properties ==