An upper bound for discrete moments of the derivative of the Riemann zeta-function
Abstract
Assuming the Riemann hypothesis, we establish an upper bound for the 2k-th discrete moment of the derivative of the Riemann zeta-function at nontrivial zeros, where k is a positive real number. Our upper bound agrees with conjectures of Gonek and Hejhal and of Hughes, Keating, and O'Connell. This sharpens a result of Milinovich. Our proof builds upon a method of Adam Harper concerning continuous moments of the zeta-function on the critical line.
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