Whittaker model

Whittaker models for GL2

If G is the algebraic group GL₂ and F is a local field, and τ is a fixed non-trivial character of the additive group of F and π is an irreducible representation of a general linear group G(F), then the Whittaker model for π is a representation π on a space of functions f on G(F) satisfying

Jacquet & Langlands (1970) used Whittaker models to assign L-functions to admissible representations of GL₂.

Whittaker models for GLn

Let G be the general linear group G L n , ψ a smooth complex valued non-trivial additive character of F and U the subgroup of G L n consisting of unipotent upper triangular matrices. A non-degenerate character on U is of the form

for u = ( x i j ) ∈ U and non-zero α 1 , ..., α n − 1 ∈ F . If ( π , V ) is a smooth representation of G ( F ) , a Whittaker functional λ is a continuous linear functional on V such that λ ( π ( u ) v ) = χ ( u ) λ ( v ) for all u ∈ U , v ∈ V . Multiplicity one states that, for π unitary irreducible, the space of Whittaker functionals has dimension at most equal to one.

Whittaker models for reductive groups

If G is a split reductive group and U is the unipotent radical of a Borel subgroup B, then a Whittaker model for a representation is an embedding of it into the induced (Gelfand–Graev) representation IndG
U(χ), where χ is a non-degenerate character of U, such as the sum of the characters corresponding to simple roots.