On the Effective Non-vanishing of Hecke--Maass L-functions at Special Points

Abstract

In this paper, we consider the non-vanishing problem for the family of special Hecke--Maass L-values L (1/2+itf, f) with f (z) in an orthonormal basis of (even or odd) Hecke--Maass cusp forms of Laplace eigenvalue 1/4 + tf2 (tf > 0). We prove that 33% of L (1/2+itf, f) for tf ≤slant T do not vanish as T → ∞. For comparison, it is known that the non-vanishing proportion is at least 25% for the central L-values L (1/2, f). Further, 33% may be raised to 50% conditionally on the generalized Riemann hypothesis. Moreover, we prove non-vanishing results on short intervals |tf-T| ≤slant Tμ for any 0 < μ < 1. However, it is a curious case that the Riemann hypothesis does not yield better result for small 0 < μ ≤slant 1/2.