Applications of the Laurent-Stieltjes constants for Dirichlet L-series
Abstract
The Laurent Stieltjes constants γn() are, up to a trivial coefficient, the coefficients of the Laurent expansion of the usual Dirichlet L-series: when is non principal, (-1)nγn() is simply the value of the n-th derivative of L(s,) at s=1. In this paper, we give an approximation of the Dirichlet L-functions in the neighborhood of s=1 by a short Taylor polynomial. We also prove that the Riemann zeta function ζ(s) has no zeros in the region |s-1|≤ 2.2093, with 0≤ (s)≤ 1.
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