Derivatives and asymptotics of Whittaker functions

Nadir Matringe

arXiv:1004.1315·math.RT·September 27, 2016

Derivatives and asymptotics of Whittaker functions

Nadir Matringe

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TL;DR

This paper develops an asymptotic expansion for Whittaker functions of generic representations over p-adic groups and characterizes certain representations in L^2 spaces, confirming a conjecture for specific groups.

Contribution

It provides a new asymptotic expansion method for Whittaker functions and verifies a conjecture relating generic representations to discrete series for G_n.

Findings

01

Asymptotic expansion of Whittaker functions established.

02

Characterization of generic representations in L^2 spaces achieved.

03

Conjecture of Lapid and Mao confirmed for G_n.

Abstract

Let $F$ be a $p$ -adic field, and $G_{n}$ one of the groups $G L (n, F)$ , $GS O (2 n - 1, F)$ , $GS p (2 n, F)$ , or $GS O (2 (n - 1), F)$ . Using the mirabolic subgroup or analogues of it, and related "derivative" functors, we give an asymptotic expansion of functions in the Whittaker model of generic representations of $G_{n}$ , with respect to a minimal set of characters of subgroups of the maximal torus. Denoting by $Z_{n}$ the center of $G_{n}$ , and by $N_{n}$ the unipotent radical of its standard Borel subgroup, we characterize generic representations occurring in $L^{2} (Z_{n} N_{n} \ G_{n})$ in terms of these characters. This is related to a conjecture of Lapid and Mao for general split groups, asserting that the generic representations occurring in $L^{2} (Z_{n} N_{n} \ G_{n})$ are the generic discrete series; we prove it for the group $G_{n}$ .

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