Iwasawa decomposition

In mathematics, the Iwasawa decomposition of a semisimple Lie group generalises the way a square real matrix can be written as a product of an orthogonal matrix and an upper triangular matrix. It is named after Kenkichi Iwasawa, the Japanese mathematician who developed this method.

Definition

G is a connected semisimple real Lie group.
is the Lie algebra of G
is the complexification of.
θ is a Cartan involution of
is the corresponding Cartan decomposition
is a maximal abelian subalgebra of
Σ is the set of restricted roots of, corresponding to eigenvalues of acting on.
Σ⁺ is a choice of positive roots of Σ
is a nilpotent Lie algebra given as the sum of the root spaces of Σ⁺
K, A, N, are the Lie subgroups of G generated by and.

Then the Iwasawa decomposition of is
and the Iwasawa decomposition of G is
meaning there is an analytic diffeomorphism from the manifold to the Lie group, sending.
The dimension of A is equal to the real rank of G.
Iwasawa decompositions also hold for some disconnected semisimple groups G, where K becomes a maximal compact subgroup provided the center of G is finite.
The restricted root space decomposition is
where is the centralizer of in and is the root space. The number
is called the multiplicity of.

Examples

If G=SL_n, then we can take K to be the orthogonal matrices, A to be the positive diagonal matrices with determinant 1, and N to be the unipotent group consisting of upper triangular matrices with 1s on the diagonal.
For the symplectic group G=Sp, a possible Iwasawa-decomposition is in terms of

Non-Archimedean Iwasawa decomposition

There is an analog to the above Iwasawa decomposition for a non-Archimedean field : In this case, the group can be written as a product of the subgroup of upper-triangular matrices and the subgroup, where is the ring of integers of.

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