First moment of Rankin-Selberg central L-values and subconvexity in the level aspect

Abstract

Let 1 N<M with N and M coprime and square-free. Through classical analytic methods we estimate the first moment of central L-values L(1/2,f× g) where f∈ S*k(N) runs over primitive holomorphic forms of level N and trivial nebentypus and g is a given form of level M. As a result, we recover the bound L(1/2,f× g) (N + M) N M when g is dihedral. The first moment method also applies to the special derivative L'(1/2,f× g) under the assumption that it is non-negative for all f∈ S*k(N).