Analytic twists of $\rm GL_3\times \rm GL_2$ automorphic forms

TL;DR

This paper develops new estimates for sums involving $ m GL_3 imes GL_2$ automorphic forms, leading to improved bounds on related $L$-functions and Fourier coefficient sums, advancing understanding in analytic number theory.

Contribution

It introduces novel analytic techniques to estimate $ m GL_3 imes GL_2$ sums, resulting in a breakthrough breaking the $O(x^{5/7+ ext{small}})$ barrier for Fourier coefficient sums.

Findings

Improved subconvexity bounds for $ m GL_3 imes GL_2$ $L$-functions in the $t$-aspect.

First breaking of the $O(x^{5/7+ ext{small}})$ barrier for Fourier coefficient sums.

Enhanced analytic estimates for sums involving automorphic forms.

Abstract

Let $\pi$ be a Hecke--Maass cusp form for $\rm SL_3(\mathbb{Z})$ with normalized Hecke eigenvalues $\lambda_{\pi}(n,r)$. Let $f$ be a holomorphic or Maass cusp form for $\rm SL_2(\mathbb{Z})$ with normalized Hecke eigenvalues $\lambda_f(n)$. In this paper, we are concerned with obtaining nontrivial estimates for the sum \begin{equation*} \sum_{r,n\geq 1}\lambda_{\pi}(n,r)\lambda_f(n)e\left(t\,\varphi(r^2n/N)\right)V\left(r^2n/N\right), \end{equation*} where $e(x)=e^{2\pi ix}$, $V(x)\in \mathcal{C}_c^{\infty}(0,\infty)$, $t\geq 1$ is a large parameter and $\varphi(x)$ is some real-valued smooth function. As applications, we give an improved subconvexity bound for $\rm GL_3\times \rm GL_2$ $L$-functions in the $t$-aspect, and under the Ramanujan--Petersson conjecture we derive the following bound for sums of $\rm GL_3\times \rm GL_2$ Fourier coefficients \begin{equation*} \sum_{r^2n\leq x}\lambda_{\pi}(r,n)\lambda_f(n)\ll_{\pi, f, \varepsilon} x^{5/7-1/364+\varepsilon} \end{equation*} for any $\varepsilon>0$, which breaks for the first time the barrier $O(x^{5/7+\varepsilon})$ in a work by Friedlander--Iwaniec.