Improved estimates for the argument and zero-counting function of the Riemann zeta-function
Abstract
In this article, we improve the recent work of Hasanalizade, Shen, and Wong by establishing \[ | N (T) - T 2 π ( T2π e) | 0.10076 T+0.24460 T+8.08344, \] for every T e, where N(T) is the number of non-trivial zeros =β+iγ, with 0<γ T, of the Riemann zeta-function ζ(s). The main source of improvement comes from implementing new subconvexity bounds for ζ(σ+it) on some σk-lines inside the critical strip.
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