The Uniform Distribution Modulo One of Certain Subsequences of Ordinates of Zeros of the Zeta Function

Abstract

On the assumption of the Riemann hypothesis and a spacing hypothesis for the nontrivial zeros 12+iγ of the Riemann zeta function, we show that the sequence \[ [a, b] =\ γ : γ>0 and (| ζ(mγ) (12+ iγ) | / (γ)mγ)12γ ∈ [a, b] \, \] where the γ are arranged in increasing order, is uniformly distributed modulo one. Here a and b are real numbers with a<b, and mγ denotes the multiplicity of the zero 12+iγ. The same result holds when the γ's are restricted to be the ordinates of simple zeros. With an extra hypothesis, we are also able to show an equidistribution result for the scaled numbers γ ( T)/2π with γ∈ [a, b] and 0<γ≤ T.

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