The Twelfth Moment of Hecke L-Functions in the Weight Aspect

Abstract

We prove an upper bound for the twelfth moment of Hecke L-functions associated to holomorphic Hecke cusp forms of weight k in a dyadic interval T ≤ k ≤ 2T as T tends to infinity. This bound recovers the Weyl-strength subconvex bound L(1/2,f) k1/3 + and shows that for any δ > 0, the sub-Weyl subconvex bound L(1/2,f) k1/3 - δ holds for all but O(T12δ + ) Hecke cusp forms f of weight at most T. Our result parallels a related result of Jutila for the twelfth moment of Hecke L-functions associated to Hecke-Maass cusp forms. The proof uses in a crucial way a spectral reciprocity formula of Kuznetsov that relates the fourth moment of L(1/2,f) weighted by a test function to a dual fourth moment weighted by a different test function.

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