Quantitative non-vanishing of central values of certain L-functions on GL(2)× GL(3)

Abstract

Let φ be an even Hecke-Maass cusp form on SL2(Z) whose L-function does not vanish at the center of the functional equation. In this article, we obtain an exact formula of the average of triple products of φ, f and f, where f runs over an orthonormal basis Hk of Hecke eigen elliptic cusp forms on SL2(Z) of a fixed weight k≥ 4. As an application, we prove a quantitative non-vanishing results on the central values for the family of degree 6 L-functions L(s,φ × Ad\,f) with f in the union of Hk ( K ≤ k < 2 K) as K→ ∞.