On the joint second moment of zeta and its logarithmic derivative
Abstract
Assuming the Riemann Hypothesis, Goldston, Gonek and Montgomery GGM studied the second moment of the log-derivative of ζ, shifted away from the half line by a/ T, and its connection with the pair correlation conjecture. In this paper, we consider a weighted version of this problem, where the average is tilted by |ζ(12+it)|2. More precisely, we provide an upper and a lower bound for the second moment of zeta times its logarithmic derivative, a/ T away from the critical line.
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