On density of the zeros of Dedekind zeta-functions
Abstract
For any σ with 0≤ σ≤ 1 and any T>10 sufficiently large, let Nζ(σ,K,T) be the number of zeros =β+iγ of ζK(s) with |γ|≤ T and β≥ σ and the zero being counted according to multiplicity. For k≥3, we have \[ Nζ(σ,K,T) T2k6σ-3(1-σ)+, \] where \[ 2k+32k+6≤ σ<1 \] and the implied constant may depend on the number field K and . This improves previous results for k≥3 of certain range of σ.
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