Structure of twisted Jacquet modules of principal series representations of $GL_{2n}(F)$

TL;DR

This paper analyzes the structure of twisted Jacquet modules of principal series representations of $GL_{2n}(F)$, providing conditions for non-vanishing and applications to non-generic representations and Shalika models.

Contribution

It offers a detailed description of twisted Jacquet modules for principal series of $GL_{2n}(F)$ and characterizes when they are non-zero, advancing understanding of their structure.

Findings

Characterization of non-zero twisted Jacquet modules

Conditions for existence of Shalika models

Structural description of modules for non-generic representations

Abstract

Let $F$ be a non-archimedean local field or a finite field. Let $\pi$ be a principal series representation of $GL_{2n}(F)$ induced from any of its maximal standard parabolic subgroups. Let $N$ be the unipotent radical of the maximal parabolic subgroup $P$ of $GL_{2n}(F)$ corresponding to the partition $(n,n).$ In this article, we describe the structure of the twisted Jacquet module $\pi_{N,\psi}$ of $\pi$ with respect to $N$ and a non-degenerate character $\psi$ of $N.$ We also provide a necessary and sufficient condition for $\pi_{N,\psi}$ to be non-zero and show that the twisted Jacquet module is non-zero under certain assumptions on the inducing data. As an application of our results, we obtain the structure of twisted Jacquet modules of certain non-generic irreducible representations of $GL_{2n}(F)$ and establish the existence of their Shalika model in the non-archimedean case. We conclude our article with a conjecture by Dipendra Prasad classifying the smooth irreducible representations of $GL_{2n}(F)$ with a non-zero twisted Jacquet module.