Consecutive moderate gaps between zeros of the Riemann zeta function
Abstract
Let 0<γ1≤ γ2 ≤ ·s denote the ordinates of nontrivial zeros of the Riemann zeta function with positive imaginary parts. For c>0 fixed (but possibly small), T large, and γn≤ T, we call a gap γn+1-γn between consecutive ordinates ``moderate'' if γn+1-γn ≥ 2π c/ T. We investigate whether infinitely often there exists r consecutive moderate gaps between ordinates γn+1-γn, γn+2-γn+1, … , γn+r- γn+r-1.
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