Counting zeros of Dedekind zeta functions
Abstract
Given a number field K of degree nK and with absolute discriminant dK, we obtain an explicit bound for the number NK(T) of non-trivial zeros (counted with multiplicity), with height at most T, of the Dedekind zeta function ζK(s) of K. More precisely, we show that for T ≥ 1, | NK (T) - Tπ ( dK ( T2π e)nK)| 0.228 ( dK + nK T) + 23.108 nK + 4.520, which improves previous results of Kadiri and Ng, and Trudgian. The improvement is based on ideas from the recent work of Bennett et al. on counting zeros of Dirichlet L-functions.
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