Mixed moment of GL(2) and GL(3) L-functions

Abstract

Let f run over the space H4k of primitive cusp forms of level one and weight 4k , k ∈ N . We prove an explicit formula for the mixed moment of the Hecke L -function L(f, 1/2) and the symmetric square L-function L(sym2f, 1/2), relating it to the dual mixed moment of the double Dirichlet series and the Riemann zeta function weighted by the 3F2 hypergeometric function. Analysing the corresponding special functions by the means of the Liouville-Green approximation followed by the saddle point method, we prove that the initial mixed moment is bounded by 3k.