The Second Moment of Rankin-Selberg L-function and Hybrid Subconvexity Bound

Abstract

Let M,N be coprime square-free integers. Let f be a holomorphic cusp form of level N and g be either a holomorphic or a Maa form with level M. Using a large sieve inequality, we establish a bound of the form Σg|L(j)(1/2+it,f g)|2 t M+M2/3-βN4/3 where β ≈ 1/500. As a consequence, we obtain subconvexity bounds for L(j)(1/2+it,f g) (MN)1/2 - α for any N<M satisfying the conditions above without using amplification methods. Moreover, by the symmetry, we establish a level aspect hybrid subconvexity bound for the full range when both forms are holomorphic.