Moments of the Hurwitz zeta function on the critical line

Abstract

We study the moments Mk(T;α) = ∫T2T |ζ(s,α)|2k\,dt of the Hurwitz zeta function ζ(s,α) on the critical line, s = 1/2 + it with a rational shift α ∈ Q. We conjecture, in analogy with the Riemann zeta function, that Mk(T;α) ck(α) T ( T)k2 . Using heuristics from analytic number theory and random matrix theory, we conjecturally compute ck(α). In the process, we investigate moments of products of Dirichlet L-functions on the critical line. We prove our conjectures for the cases k = 1,2.