A note on Kirillov model for representations of GLn(C)

Abstract

Let G=GLn(C) and 1:C× be an additive character. Let U be the subgroup of upper triangular unipotent matrices in G. Denote by θ the character θ:U given by \[ θ(u):=(u1,2+u2,3+...+un-1,n). \] Let P be the mirabolic subgroup of G consisting of all matrices in G with the last row equal to (0,0,...,0,1). We prove that if π is an irreducible generic representation of GLn(C) and W(π,) is its Whittaker model, then the space \f|P:P C:\, f∈ W(π,)\ contains the space of infinitely differentiable functions f:P C which satisfy f(up)=(u)f(p) for all u∈ U and p∈ P and which have a compact support modulo U. A similar result was proven for GLn(F), where F is a p-adic field by Gelfand and Kazhdan in "Representations of the group GL(n,K) where K is a local field", Lie groups and their representations, Proc. Summer School, Bolyai J\'anos Math. Soc., Budapest:95-118, 1975, and for GLn(R) by Jacquet in "Distinction by the quasi-split unitary group", Israel Journal of Mathematics, 178(1):269-324, 2010.