Density results for r-gaps between zeros of the Riemann zeta-function
Abstract
Let 0<γ1≤ γ2≤ … denote the positive ordinates of the non-trivial zeros of the Riemann zeta-function. A result first announced by Selberg states that there exist absolute constants , >0 such that for each r∈ N, \[ n ∞γn+r-γn2π r/ γn≥ 1+rα and n ∞γn+r-γn2π r/ γn≤ 1-rα \] where α may be taken as 2/3, or as 1/2 if one assumes the Riemann hypothesis. This was recently proved by Conrey and Turnage-Butterbaugh under RH and by Inoue unconditionally. We prove that in fact a positive proportion of r-gaps are large (and small) to the above extent, and we provide explicit estimates for the sizes and proportions of these gaps. In the case r=1, this quantitatively improves an unconditional result of Simonic, Trudgian and Turnage-Butterbaugh.
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