An unconditional Montgomery Theorem for Pair Correlation of Zeros of the Riemann Zeta Function

Abstract

Assuming the Riemann Hypothesis (RH), Montgomery proved a theorem concerning pair correlation of zeros of the Riemann zeta-function. One consequence of this theorem is that, assuming RH, at least 67.9\% of the nontrivial zeros are simple. Here we obtain an unconditional form of Montgomery's theorem and show how to apply it to prove the following result on simple zeros: Assuming all the zeros =β+iγ of the Riemann zeta-function such that T3/8<γ T satisfy |β-1/2|<1/(2 T), %lie in the thin box \s=σ +it: |σ-1/2|<1/(2 T),\ T3/8<t T\, then, as T tends to infinity, at least 61.7\% of these zeros are simple. The method of proof neither requires nor provides any information on whether any of these zeros are on or not on the critical line where β=1/2. We also obtain the same result under the weaker assumption of a strong zero-density hypothesis.