Discretization of the maximum for the derivatives of a random model of |ζ| on the critical line

Abstract

In this short note, we study the derivatives of all orders for the random field XT(h) = Σp ≤ T Re(Up \, p-i h)p1/2, h∈ [0,1], where (Up, \, p ~primes) is an i.i.d. sequence of uniform random variables on the unit circle in C. We show that the maximum of XT, and more generally the maximum of its j-th derivative, varies on a ( T)-12(j+2) scale, which improves and extends the main result in Arguin & Ouimet (2019) and makes further progress towards the open problem of the tightness of the recentered maximum of XT. Our proof is also much simpler and shorter.