On the Logarithm of the Riemann Zeta-function Near the Nontrivial Zeros

Abstract

Assuming the Riemann hypothesis and Montgomery's Pair Correlation Conjecture, we investigate the distribution of the sequences (|ζ(+z)|) and (ζ(+z)). Here =12+iγ runs over the nontrivial zeros of the zeta-function, 0<γ ≤ T, T is a large real number, and z=u+iv is a nonzero complex number of modulus 1/ T. Our approach proceeds via a study of the integral moments of these sequences. If we let z tend to 0 and further assume that all the zeros are simple, we can replace the pair correlation conjecture with a weaker spacing hypothesis on the zeros and deduce that the sequence ( (|ζ()|/ T)) has an approximate Gaussian distribution with mean 0 and variance 12 T. This gives an alternative proof of an old result of Hejhal and improves it by providing a rate of convergence to the distribution.