Expository notes on Spectral Reciprocity with Explicit Transform
Abstract
We assemble three basic analytic inputs -- the Kuznetsov trace formula on with explicit continuous spectrum, the Voronoi formula, and -aspect second-moment bounds for -- into a single framework for a smoothed spectral average. For a fixed Hecke-Maass cusp form on , we evaluate a weight- spectral average of over the Maass spectrum. In the Kuznetsov normalization where the diagonal transform has density , the diagonal contributes exactly ; the off-diagonal and the continuous spectrum are bounded with power savings consistent with the currently best unconditional second-moment bounds in the -aspect. The argument is organized into a sequence of steps: normalizations and approximate functional equations, insertion into Kuznetsov, Voronoi summation on , a bilinear estimate for the off-diagonal, evaluation of the diagonal and the Eisenstein contribution, moment refinements and parameter optimization, and finally plateau-smooth spectral windows and standard generalizations.
Cite
@article{arxiv.2512.12118,
title = {Expository notes on Spectral Reciprocity with Explicit Transform},
author = {Haonan Gu},
journal= {arXiv preprint arXiv:2512.12118},
year = {2025}
}