Weighted averages of SL2(R) automorphic kernel, Part I: non-oscillatory functions

Abstract

We prove a theorem that evaluates weighted averages of sums parametrised by congruence subgroups of SL2(Z). In the proof, spectral methods are applied directly to the automorphic kernel instead of going over sums of Kloosterman sums. In number theoretical applications this better preserves the specific symmetries throughout the application of spectral methods. In a separate paper we apply the main theorem to quadratic polynomials and obtain new results about their greatest prime factor and the equidistribution of their roots to prime moduli.