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ABSTRACT
We seek to understand how the technical definition of a Lehmer pair can be related to more analytic properties of the Riemann zeta function, particularly the location of the zeros of ζ′(s). Because we are interested in the connection [CitationCsordas et al. 94] between Lehmer pairs and the de Bruijn–Newman constant Λ, we assume the Riemann hypothesis throughout. We define strong Lehmer pairs via an inequality on the derivative of the pre-Schwarzian of Riemann’s function Ξ(t), evaluated at consecutive zeros:
Theorem 1 shows that strong Lehmer pairs are Lehmer pairs. Theorem 2 describes PΞ′(γ) in terms of ζ′(ρ) where ρ = 1/2 + iγ. Theorem 3 expresses PΞ′(γ+) + PΞ′(γ−) in terms of nearby zeros ρ′ of ζ′(s). We examine 114, 661 pairs of zeros of ζ(s) around height t = 106, finding 855 strong Lehmer pairs. These are compared to the corresponding zeros of ζ′(s) in the same range.
Acknowledgments
We would like to thank David Farmer for sharing his computations of zeros of ζ′(s) in the range 106 ≤ t ≤ 106 + 6 · 104 and the anonymous referee for a careful reading of the manuscript and helpful suggestions.
Notes
1 Red–yellow–green–blue, as one travels around the origin counterclockwise.
2 In [CitationDueñez et al. 10, Section 6], Y is assumed to be 0.
3 And with a slight bias to be negative, since the π/4 term gives Y a slight bias to be positive.
4 It would be desirable to bound the error in making this approximation.