Local Langlands conjectures

In mathematics, the local Langlands conjectures, introduced by Robert Langlands (1967, 1970), are part of the Langlands program. They describe a correspondence between the complex representations of a reductive algebraic group G over a local field F, and representations of the Langlands group of F into the L-group of G. This correspondence is not a bijection in general. The conjectures can be thought of as a generalization of local class field theory from abelian Galois groups to non-abelian Galois groups.

Local Langlands conjectures for GL₁

The local Langlands conjectures for GL₁(K) follow from (and are essentially equivalent to) local class field theory. More precisely the Artin map gives an isomorphism from the group GL₁(K) = K^* to the abelianization of the Weil group. In particular irreducible smooth representations of GL₁(K) are 1-dimensional as the group is abelian, so can be identified with homomorphisms of the Weil group to GL₁(C). This gives the Langlands correspondence between homomorphisms of the Weil group to GL₁(C) and irreducible smooth representations of GL₁(K).

Representations of the Weil group

Representations of the Weil group do not quite correspond to irreducible smooth representations of general linear groups. To get a bijection, one has to slightly modify the notion of a representation of the Weil group, to something called a Weil–Deligne representation. This consists of a representation of the Weil group on a vector space V together with a nilpotent endomorphism N of V such that wNw⁻¹ = ||w||N, or equivalently a representation of the Weil–Deligne group. In addition the representation of the Weil group should have an open kernel, and should be (Frobenius) semisimple.

For every Frobenius semisimple complex n-dimensional Weil–Deligne representation ρ of the Weil group of F there is an L-function L(s,ρ) and a local ε-factor ε(s,ρ,ψ) (depending on a character ψ of F).

Representations of GL_n(F)

The representations of GL_n(F) appearing in the local Langlands correspondence are smooth irreducible complex representations.

• "Smooth" means that every vector is fixed by some open subgroup.
• "Irreducible" means that the representation is nonzero and has no subrepresentations other than 0 and itself.

Smooth irreducible complex representations are automatically admissible.

The Bernstein–Zelevinsky classification reduces the classification of irreducible smooth representations to cuspidal representations.

For every irreducible admissible complex representation π there is an L-function L(s,π) and a local ε-factor ε(s,π,ψ) (depending on a character ψ of F). More generally, if there are two irreducible admissible representations π and π' of general linear groups there are local Rankin–Selberg convolution L-functions L(s,π×π') and ε-factors ε(s,π×π',ψ).

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Local Langlands conjectures for GL₂

The local Langlands conjecture for GL₂ of a local field says that there is a (unique) bijection π from 2-dimensional semisimple Weil-Deligne representations of the Weil group to irreducible smooth representations of GL₂(F) that preserves L-functions, ε-factors, and commutes with twisting by characters of F^*.

Script error: No such module "Footnotes". verified the local Langlands conjectures for GL₂ in the case when the residue field does not have characteristic 2. In this case the representations of the Weil group are all of cyclic or dihedral type. Script error: No such module "Footnotes". classified the smooth irreducible representations of GL₂(F) when F has odd residue characteristic (see also Script error: No such module "Footnotes".), and claimed incorrectly that the classification for even residue characteristic differs only insignifictanly from the odd residue characteristic case. Script error: No such module "Footnotes". pointed out that when the residue field has characteristic 2, there are some extra exceptional 2-dimensional representations of the Weil group whose image in PGL₂(C) is of tetrahedral or octahedral type. (For global Langlands conjectures, 2-dimensional representations can also be of icosahedral type, but this cannot happen in the local case as the Galois groups are solvable.) Script error: No such module "Footnotes". proved the local Langlands conjectures for the general linear group GL₂(K) over the 2-adic numbers, and over local fields containing a cube root of unity. Kutzko (1980, 1980b) proved the local Langlands conjectures for the general linear group GL₂(K) over all local fields.

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Local Langlands conjectures for GL_n

The local Langlands conjectures for general linear groups state that there are unique bijections π ↔ ρ_π from equivalence classes of irreducible admissible representations π of GL_n(F) to equivalence classes of continuous Frobenius semisimple complex n-dimensional Weil–Deligne representations ρ_π of the Weil group of F, that preserve L-functions and ε-factors of pairs of representations, and coincide with the Artin map for 1-dimensional representations. In other words,

• L(s,ρ_π⊗ρ_π') = L(s,π×π')
• ε(s,ρ_π⊗ρ_π',ψ) = ε(s,π×π',ψ)

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Local Langlands conjectures for other groups

Script error: No such module "Footnotes". and Script error: No such module "Footnotes". discuss the Langlands conjectures for more general groups. The Langlands conjectures for arbitrary reductive groups G are more complicated to state than the ones for general linear groups, and it is unclear what the best way of stating them should be. Roughly speaking, admissible representations of a reductive group are grouped into disjoint finite sets called L-packets, which should correspond to some classes of homomorphisms, called L-parameters, from the local Langlands group to the L-group of G. Some earlier versions used the Weil−Deligne group or the Weil group instead of the local Langlands group, which gives a slightly weaker form of the conjecture.

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References

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• Script error: No such module "citation/CS1". English translation in volume 2 of Gelfand's collected works.
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External links

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• The work of Robert Langlands
• Automorphic Forms - The local Langlands conjecture Lecture by Richard Taylor