In
mathematics, the Langlands classification is a description of the
irreducible representations of a reductive
Lie group
In mathematics, a Lie group (pronounced ) is a group that is also a differentiable manifold. A manifold is a space that locally resembles Euclidean space, whereas groups define the abstract concept of a binary operation along with the ad ...
''G'', suggested by
Robert Langlands (1973). There are two slightly different versions of the Langlands classification. One of these describes the irreducible
admissible (''g'',''K'')-
module
Module, modular and modularity may refer to the concept of modularity. They may also refer to:
Computing and engineering
* Modular design, the engineering discipline of designing complex devices using separately designed sub-components
* Modul ...
s,
for ''g'' a
Lie algebra of a reductive Lie group ''G'', with
maximal compact subgroup ''K'', in terms of
tempered representations of smaller groups. The tempered representations were in turn classified by
Anthony Knapp
Anthony W. Knapp (born 2 December 1941, Morristown, New Jersey) is an American mathematician at the State University of New York, Stony Brook working on representation theory, who classified the tempered representations of a semisimple Lie group. ...
and
Gregg Zuckerman. The other version of the Langlands classification divides the irreducible representations into
L-packet In the field of mathematics known as representation theory, an L-packet is a collection of (isomorphism classes of) irreducible representations of a reductive group over a local field, that are L-indistinguishable, meaning they have the same Langla ...
s, and classifies the L-packets in terms of certain homomorphisms of the
Weil group of R or C into the
Langlands dual group.
Notation
*''g'' is the Lie algebra of a real reductive Lie group ''G'' in the
Harish-Chandra class.
*''K'' is a maximal compact subgroup of ''G'', with Lie algebra ''k''.
*ω is a
Cartan involution
In mathematics, the Cartan decomposition is a decomposition of a semisimple Lie group or Lie algebra, which plays an important role in their structure theory and representation theory. It generalizes the polar decomposition or singular value deco ...
of ''G'', fixing ''K''.
*''p'' is the −1 eigenspace of a Cartan involution of ''g''.
*''a'' is a maximal abelian subspace of ''p''.
*Σ is the
root system of ''a'' in ''g''.
*Δ is a set of
simple roots of Σ.
Classification
The Langlands classification states that the irreducible
admissible representations of (''g'',''K'') are parameterized by triples
:(''F'', σ,λ)
where
*''F'' is a subset of Δ
*''Q'' is the standard
parabolic subgroup
In the theory of algebraic groups, a Borel subgroup of an algebraic group ''G'' is a maximal Zariski closed and connected solvable algebraic subgroup. For example, in the general linear group ''GLn'' (''n x n'' invertible matrices), the subgroup ...
of ''F'', with
Langlands decomposition
In mathematics, the Langlands decomposition writes a parabolic subgroup ''P'' of a semisimple Lie group as a product P=MAN of a reductive subgroup ''M'', an abelian subgroup ''A'', and a nilpotent subgroup ''N''.
Applications
A key applicat ...
''Q'' = ''MAN''
*σ is an irreducible tempered representation of the semisimple Lie group ''M'' (up to isomorphism)
*λ is an element of Hom(''a''
''F'',C) with α(Re(λ))>0 for all simple roots α not in ''F''.
More precisely, the irreducible admissible representation given by the data above is the irreducible quotient of a parabolically induced representation.
For an example of the Langlands classification, see the
representation theory of SL2(R).
Variations
There are several minor variations of the Langlands classification. For example:
*Instead of taking an irreducible quotient, one can take an irreducible submodule.
*Since tempered representations are in turn given as certain representations induced from discrete series or limit of discrete series representations, one can do both inductions at once and get a Langlands classification parameterized by discrete series or limit of discrete series representations instead of tempered representations. The problem with doing this is that it is tricky to decide when two irreducible representations are the same.
References
*
*E. P. van den Ban, ''Induced representations and the Langlands classification,'' in (T. Bailey and A. W. Knapp, eds.).
*
Borel, A. and
Wallach, N. ''Continuous cohomology, discrete subgroups, and representations of reductive groups''. Second edition. Mathematical Surveys and Monographs, 67. American Mathematical Society, Providence, RI, 2000. xviii+260 pp.
*
*
*D. Vogan, ''Representations of real reductive Lie groups'', {{isbn, 3-7643-3037-6
Representation theory of Lie groups