Extreme values of derivatives of the Riemann zeta function
Abstract
It is proved that if T is sufficiently large, then uniformly for all positive integers ≤slant ( T) / (2 T), we have equation* T≤slant t≤slant 2T|ζ()(1+it)| ≥slant eγ· · (+1) -(+1)·(2 T - 3 T + O(1))+1 \,, equation* where γ is the Euler constant. We also establish lower bounds for maximum of |ζ()(σ+it)| when ∈ N and σ ∈ [1/2, \,1) are fixed.
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