La transform\'ee de Fourier pour les espaces tordus sur un groupe r\'eductif $\mathfrak{p}$-adique I. Le th\'eor\`eme de Paley-Wiener

TL;DR

This paper studies the Fourier transform for twisted representations of reductive p-adic groups, establishing a Paley-Wiener theorem and analyzing the kernel related to spectral density in this context.

Contribution

It provides a description of the image of the twisted Fourier transform and reduces the kernel description to a discrete spectral result, advancing harmonic analysis on p-adic groups.

Findings

Characterization of the Fourier transform image for twisted representations

Reduction of kernel description to discrete spectral theory

Extension of Paley-Wiener theorem to twisted settings

Abstract

Let ${\boldsymbol{G}}$ be a connected reductive group defined over a non--Archimedean local field $F$. Put $G={\boldsymbol{G}}(F)$. Let $\theta$ be an $F$--automorphism of ${\boldsymbol{G}}$, and let $\omega$ be a smooth character of $G$. This paper is concerned with the smooth complex representations $\pi$ of $G$ such that $\pi^\theta=\pi\circ\theta$ is isomorphic to $\omega\pi=\omega\otimes\pi$. If $\pi$ is admissible, in particular irreducible, the choice of an isomorphism $A$ from $\omega\pi$ to $\pi^\theta$ (and of a Haar measure on $G$) defines a distribution $\Theta_\pi^A={\rm tr}(\pi\circ A)$ on $G$. The twisted Fourier transform associates to a compactly supported locally constant function $f$ on $G$, the function $(\pi,A)\mapsto \Theta_\pi^A(f)$ on a suitable Grothendieck group. Here we describe its image (Paley--Wiener theorem), and we reduce the description of its kernel (spectral density theorem) to a result on the discrete part of the theory.