On the Effective Non-vanishing of Rankin--Selberg L-functions at Special Points

Abstract

Let Q (z) be a holomorphic Hecke cusp newform of square-free level and uj (z) traverse an orthonormal basis of Hecke--Maass cusp forms of full level. Let 1/4 + tj2 be the Laplace eigenvalue uj (z). In this paper, we prove that there is a constant γ (Q) expressed as a certain Euler product associated to Q such that at least γ (Q) / 11 of the Rankin--Selberg special L-values L (1/2+itj, Q uj) for tj ≤slant T do not vanish as T → ∞. Further, we show that the non-vanishing proportion is at least γ (Q) · (4μ-3) / (4μ+7) on the short interval |tj - T| ≤slant Tμ for any 3/4 < μ < 1.