On binary correlations of Fourier coefficients of holomorphic cusp forms at prime arguments
Abstract
Let \λf(n)\n ≥ 1 be the normalized Hecke eigenvalues of a given holomorphic cusp form f of even weight k. We show under the assumption of the existence of Littlewood's type zero free region for L(s, f, ), where is a Dirichlet character modulo q, that if X2/3+ H X1- with >0, then for any A≥ 1, Σ1≤ |h|≤ H| ΣX<n,\: m ≤ 2X \\ n - m = h λf(n)(n)λf(m)(m) |2 A HX2( X)A holds. Moreover, under an additional hypothesis on the fourth moment of certain Dirichlet polynomials (which follows from GRH for L(s, f)), we show that the above result can be strengthened to hold in a wider range X1/3+ H X1-. Finally, if we average over the forms f, then for X H X1- and for any A≥ 1, Σf∈ HkωfΣ1≤ |h|≤ H| ΣX<n,\: m ≤ 2X \\ n - m = h λf(n)(n)λf(m)(m) |2 AHX2( X)A, where Hk is the Hecke basis for the space of holomorphic cusp forms of weight k for the full modular group SL(2, Z) and ωf are harmonic weights associated with f∈ Hk. These results may be viewed as modular analogues of the averaged forms of the Hardy--Littlewood prime tuple conjecture.
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