Spectral Reciprocity: A Fourier--Analytic Approach

TL;DR

This paper introduces a Fourier-analytic framework to establish spectral reciprocity formulas connecting $ ext{GL}_3$ and $ ext{GL}_2$ automorphic spectra, enabling new results in $L$-function estimates and nonvanishing over number fields.

Contribution

It develops a unified Fourier-analytic approach to spectral reciprocity, extending existing formulas to new settings and providing explicit weight transforms for automorphic representations.

Findings

First-moment estimates for $ ext{GL}_3 imes ext{GL}_2$ $L$-functions over number fields

Explicit twisted fourth moment for $ ext{GL}_2$ $L$-functions over totally real fields

Sharp upper bounds for the fifth moment and subconvexity results

Abstract

We develop a Fourier--analytic framework for establishing spectral reciprocity formulas linking $\mathrm{GL}_3$ and $\mathrm{GL}_2$ automorphic spectra over number fields. The method applies uniformly to cuspidal and non-cuspidal $\mathrm{GL}_3$ representations and treats Motohashi-type and Blomer--Khan-type reciprocities in a parallel manner, revealing intrinsic connections between them and extending each to new settings. We also obtain explicit weight transforms in the analytic newvector and spherical cases. Applications include first-moment estimates for $\mathrm{GL}_3\times\mathrm{GL}_2$ $L$-functions over number fields, an explicit twisted fourth moment for $\mathrm{GL}_2$ $L$-functions over totally real fields, a sharp upper bound for the fifth moment, subconvexity for triple product $L$-functions, and new simultaneous nonvanishing results.