Shifting the ordinates of zeros of the Riemann zeta function
Speaker: William Banks
Date: Wed, Jun 19, 2024
Location: PIMS, University of British Columbia
Conference: Comparative Prime Number Theory
Subject: Mathematics, Number Theory
Class: Scientific
CRG: L-Functions in Analytic Number Theory
Date: Wed, Jun 19, 2024
Location: PIMS, University of British Columbia
Conference: Comparative Prime Number Theory
Subject: Mathematics, Number Theory
Class: Scientific
CRG: L-Functions in Analytic Number Theory
Abstract:
Let y≠0 and C>0. Under the Riemann Hypothesis, there is a number T∗>0 (depending on y and C) such that for every T>T∗, both
ζ(12+iγ)=0andζ(12+i(γ+y))≠0
hold for at least one γ in the interval [T,T(1+ϵ], where ϵ:=T−C/loglogT.
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