Kirillov model

In mathematics, the Kirillov model, studied by Template:Harvs, is a realization of a representation of GL₂ over a local field on a space of functions on the local field.

If G is the algebraic group GL₂ and F is a non-Archimedean local field, and τ is a fixed nontrivial character of the additive group of F and π is an irreducible representation of G(F), then the Kirillov model for π is a representation π on a space of locally constant functions f on F^* with compact support in F such that

${\displaystyle \pi \left(\left(\begin{array}{cc}a& b\\ 0& 1\end{array}\right)\right)f(x)=\tau (bx)f(ax).}$

Template:Harvtxt showed that an irreducible representation of dimension greater than 1 has an essentially unique Kirillov model. Over a local field, the space of functions with compact support in F^* has codimension 0, 1, or 2 in the Kirillov model, depending on whether the irreducible representation is cuspidal, special, or principal.

The Whittaker model can be constructed from the Kirillov model, by defining the image W_ξ of a vector ξ of the Kirillov model by

W_ξ(g) = π(g)ξ(1)

where π(g) is the image of g in the Kirillov model.

Template:Harvtxt defined the Kirillov model for the general linear group GL_n using the mirabolic subgroup. More precisely, a Kirillov model for a representation of the general linear group is an embedding of it in the representation of the mirabolic group induced from a non-degenerate character of the group of upper triangular matrices.

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