The Fyodorov-Hiary-Keating Conjecture. II (2307.00982v1)

Abstract: We prove a lower bound on the maximum of the Riemann zeta function in a typical short interval on the critical line. Together with the upper bound from the previous work of the authors, this implies tightness of $$ \max_{|h|\leq 1}|\zeta(\tfrac 12+{\rm i} \tau+{\rm i} h)|\cdot \frac{(\log\log T)^{3/4}}{\log T}, $$ for large $T$, where $\tau$ is uniformly distributed on $[T,2T]$. The techniques are also applied to bound the right tail of the maximum, proving the distributional decay $\asymp y e^{-2y}$ for $y$ positive. This confirms the Fyodorov-Hiary-Keating conjecture, which states that the maximum of $\zeta$ in short intervals lies in the universality class of logarithmically correlated fields.