Langlands decomposition

In mathematics, the Langlands decomposition writes a parabolic subgroup P of a semisimple Lie group as a product ${\displaystyle P=MAN}$ of a reductive subgroup M, an abelian subgroup A, and a nilpotent subgroup N.

A key application is in parabolic induction, which leads to the Langlands program: if ${\displaystyle G}$ is a reductive algebraic group and ${\displaystyle P=MAN}$ is the Langlands decomposition of a parabolic subgroup P, then parabolic induction consists of taking a representation of ${\displaystyle MA}$, extending it to ${\displaystyle P}$ by letting ${\displaystyle N}$ act trivially, and inducing the result from ${\displaystyle P}$ to ${\displaystyle G}$.

• Lie group decompositions

• A. W. Knapp, Structure theory of semisimple Lie groups. Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value)..