English

Metaplectic cusp forms and the large sieve

Number Theory 2025-11-11 v4

Abstract

We prove a power saving upper bound for the sum of Fourier coefficients ρf()\rho_f(\cdot) of a fixed cubic metaplectic cusp form ff over primes. Our result is the cubic analogue of a celebrated 1990 Theorem of Duke and Iwaniec, and the cuspidal analogue of a Theorem due to the author and Radziwill for the bias in cubic Gauss sums. The proof has two main inputs, both of independent interest. Firstly, we prove a new large sieve estimate for a bilinear form whose kernel function is ρf()\rho_f(\cdot). The proof of the bilinear estimate uses a number field version of circle method due to Browning and Vishe, Voronoi summation, and Gauss-Ramanujan sums. Secondly, we use Voronoi summation and the cubic large sieve of Heath-Brown to prove an estimate for a linear form involving ρf()\rho_f(\cdot). Our linear estimate overcomes a bottleneck occurring at level of distribution 2/32/3.

Keywords

Cite

@article{arxiv.2403.13151,
  title  = {Metaplectic cusp forms and the large sieve},
  author = {Alexander Dunn},
  journal= {arXiv preprint arXiv:2403.13151},
  year   = {2025}
}

Comments

Minor improvements to exposition

R2 v1 2026-06-28T15:26:34.879Z