Cancellation in additively twisted sums on GL(2) with non-linear phase

Abstract

Let λg (n) be the Fourier coefficients of a holomorphic cusp modular form g for SL2 (Z). The aim of this article is to get non-trivial bound on non-linearly additively twisted sums of the Fourier coefficients λg (n). Precisely, we prove for any 3/4 < β < 3/2, β ≠ 1 , the following non-trivial estimate Σn ≤ Nλg(n)\,e(α\, nβ)g, α, β, N12+ β3 + + N32- 2β3 + , for any > 0. This is the first time that non-trivial estimate for such sums is achieved for 1 < β < 3/2, breaking the barrier β = 1 in the work of X. Ren and Y. Ye. It also improves their estimate in the range 9/10 < β < 1. The key of our approach is a newly developed Bessel δ-method.