Large GCD sums and extreme values of the Riemann zeta function
Abstract
It is shown that the maximum of |ζ(1/2+it)| on the interval T1/2 t T is at least ((1/2+o(1)) T T/ T). Our proof uses Soundararajan's resonance method and a certain large GCD sum. The method of proof shows that the absolute constant A in the inequality \[ 1 n1<·s < nN Σk,=1N(nk,n)nk n N (A N N N), \] established in a recent paper of ours, cannot be taken smaller than 1.
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