On the extreme values of the Riemann zeta function on random intervals of the critical line

Abstract

In the present paper, we show that under the Riemann hypothesis, and for fixed h, ε > 0, the supremum of the real and the imaginary parts of ζ (1/2 + it) for t ∈ [UT -h, UT + h] are in the interval [(1-ε) T, (1+ ε) T] with probability tending to 1 when T goes to infinity, if U is uniformly distributed in [0,1]. This proves a weak version of a conjecture by Fyodorov, Hiary and Keating, which has recently been intensively studied in the setting of random matrices. We also unconditionally show that the supremum of ζ(1/2 + it) is at most T + g(T) with probability tending to 1, g being any function tending to infinity at infinity.