Hilbert spaces and the pair correlation of zeros of the Riemann zeta-function

Abstract

Montgomery's pair correlation conjecture predicts the asymptotic behavior of the function N(T,β) defined to be the number of pairs γ and γ' of ordinates of nontrivial zeros of the Riemann zeta-function satisfying 0<γ,γ'≤ T and 0 < γ'-γ ≤ 2π β/ T as T ∞. In this paper, assuming the Riemann hypothesis, we prove upper and lower bounds for N(T,β), for all β >0, using Montgomery's formula and some extremal functions of exponential type. These functions are optimal in the sense that they majorize and minorize the characteristic function of the interval [-β, β] in a way to minimize the L1(R, \1 - ( π xπ x)2 \\,dx)-error. We give a complete solution for this extremal problem using the framework of reproducing kernel Hilbert spaces of entire functions. This extends previous work by P. X. Gallagher in 1985, where the case β ∈ 12 N was considered using non-extremal majorants and minorants.