The Second Moment of Sums of Hecke Eigenvalues I
Abstract
Let f be a holomorphic Hecke cusp form of weight k for SL2(Z), and let (λf(n))n≥1 denote its sequence of Hecke eigenvalues. We compute the first and second moments of the sums S(x,f)=Σx≤ n≤ 2xλf(n), on average over forms f of large weight k, in the regime where the length of the sums x is smaller than k2. We observe transitions in the size of the sums when x≈ k and x≈ k2. In subsequent work (part II), it will be shown that once x is larger than k2 (where the latter transition occurs), the average size of the sums S(x,f) becomes dramatically smaller.
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