Conditional Upper Bounds for Large Deviations and Moments of the Riemann Zeta Function
Abstract
Assuming the Riemann Hypothesis, we show that for k>0 1Tmeas\t∈ [T,2T]:|ζ(1/2+ i t)|>( T)k\≤ Ck ( T)-k2 T, where Ck=(eck) for some absolute constant c>0. This implies that the 2k-moments of |ζ| are bounded above by Ck( T)k2, recovering the bound of Harper. The proof relies on the recursive scheme of one of the authors with Bourgade and Radziwill (2020), and combines ideas of Soundararajan (2009) and Harper (2013).
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