Non-linear additive twist of Fourier coefficients of GL(3) × GL(2) and GL(3) Maass forms

Abstract

Let λπ(m,n) be the Fourier coefficients of a Hecke-Maass cusp form π for SL(3,Z) and λf(n) be the Fourier coefficients of Hecke-eigen form f for SL(2,Z). The aim of this article is to get a non-trivial bound on the sum which is non-linear additive twist of the coefficients λπ(m,n) and λf(n). More precisely, for any 0 < β < 1 and ε>0, we have Σn=1∞ λπ(r,n) \, e(α nβ) V(nX) π,ε α βr76X34+9β28+ ε. and Σn=1∞ λπ(r,n) \, λf(n) \, e(α nβ) V(nX) π, f,ε (α β)32 rX34+29β44+ε, where V(x) is a smooth function supported in [1,2] and satisfying V(j)(x) j 1.