Explicit estimates for the logarithmic derivative and the reciprocal of the Riemann zeta function
Abstract
In this article, we give explicit bounds of order t for σ close to 1, for two quantities: |ζ'(σ +it)/ζ(σ +it)| and |1/ζ(σ +it)|. We correct an error in the literature, and especially in the case of |1/ζ(σ +it)|, also provide improvements in the constants. Using an argument involving the trigonometric polynomial, we additionally provide a slight asymptotic improvement within the classical zero-free region: 1/ζ(σ +it) ( t)11/12. The same method applied to the Korobov--Vinogradov zero-free region gives a new record: the unconditional bound 1/ζ(σ +it) ( t)2/3( t)1/4.
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