Large Sums of Fourier Coefficients of Cusp Forms

Abstract

Let N be a fixed positive integer, and let f∈ Sk(N) be a primitive cusp form given by the Fourier expansion f(z)=Σn=1∞ λf(n)nk-12e(nz). We consider the partial sum S(x,f)=Σn≤ xλf(x). It is conjectured that S(x,f)=o(x x) in the range x≥ kε. Lamzouri proved in arXiv:1703.10582 [math.NT] that this is true under the assumption of the Generalized Riemann Hypothesis (GRH) for L(s,f). In this paper, we prove that this conjecture holds under a weaker assumption than GRH. In particular, we prove that given ε>( k)-18 and 1≤ T≤ ( k)1200, we have S(x,f) x xT in the range x≥ kε provided that L(s,f) has no more than ε2 k/5000 zeros in the region \s\,:\, (s)≥ 34, \, |(s)-φ| ≤ 14\ for every real number φ with |φ|≤ T.