A log-free zero-density estimate and small gaps in coefficients of L-functions

Abstract

Let L(s, π×π) be the Rankin--Selberg L-function attached to automorphic representations π and π. Let π and π denote the contragredient representations associated to π and π. Under the assumption of certain upper bounds for coefficients of the logarithmic derivatives of L(s, π×π) and L(s, π×π), we prove a log-free zero-density estimate for L(s, π×π) which generalises a result due to Fogels in the context of Dirichlet L-functions. We then employ this log-free estimate in studying the distribution of the Fourier coefficients of an automorphic representation π. As an application we examine the non-lacunarity of the Fourier coefficients bf(p) of a modular newform f(z)=Σn=1∞ bf(n) e2π i n z of weight k, level N, and character . More precisely for f(z) and a prime p, set jf(p):=x;~x> p Jf (p, x), where Jf (p, x):=\#\ prime~q;~aπ(q)=0~ for~all~p<q≤ x\. We prove that jf(p)f, θ pθ for some 0<θ<1.