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An unconditional Montgomery theorem for pair correlation of zeros of the Riemann zeta-function

Volume 214 / 2024

Siegfred Alan C. Baluyot, Daniel Alan Goldston, Ade Irma Suriajaya, Caroline L. Turnage-Butterbaugh Acta Arithmetica 214 (2024), 357-376 MSC: Primary 11M06; Secondary 11M26 DOI: 10.4064/aa230612-20-3 Published online: 22 April 2024

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: If all the zeros $\rho =\beta +i\gamma $ of the Riemann zeta-function such that $T^{3/8} \lt \gamma \le T$ satisfy $|\beta -1/2| \lt 1/(2\log T)$, 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 or are not on the critical line where $\beta =1/2$. We also obtain the same result under the weaker assumption of a strong zero-density hypothesis.

Authors

  • Siegfred Alan C. BaluyotAmerican Institute of Mathematics
    Caltech 8-32
    Pasadena, CA 91125, USA
    e-mail
  • Daniel Alan GoldstonDepartment of Mathematics and Statistics
    San José State University
    San José, CA 95192-0103, USA
    e-mail
  • Ade Irma SuriajayaFaculty of Mathematics
    Kyushu University
    Fukuoka 819-0395, Japan
    e-mail
  • Caroline L. Turnage-ButterbaughMathematics and Statistics Department
    Carleton College
    Northfield, MN 55057, USA
    e-mail

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