Polynomial Moments with a weighted Zeta Square measure on the critical line

Abstract

We prove closed-form identities for the sequence of moments ∫ t2n|(s)ζ(s)|2dt on the whole critical line s=1/2+it. They are finite sums involving binomial coefficients, Bernoulli numbers, Stirling numbers and π, especially featuring the numbers ζ(n)Bn/n unveiled by Bettin and Conrey. Their main power series identity, together with our previous work, allows for a short proof of an auxiliary result: the computation of the k-th derivatives at 1 of the "exponential auto-correlation" function studied in DH21a. We also provide an elementary and self-contained proof of this secondary result. The starting point of our work is a remarkable identity proven by Ramanujan in 1915. %today interpreted as a Mellin-Plancherel isometry involving the and ζ functions. The sequence of moments studied here, not to be confused with the moments of the Riemann zeta function, entirely characterizes |ζ| on the critical line. They arise in some generalizations of the Nyman-Beurling criterion, but might be of independent interest for %various other applications, as well as for the numerous connections concerning the above mentioned numbers.