Fourier series for zeta function via Sinc |
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| Authors: | Frank Stenger |
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| Affiliation: | School of Computing, University of Utah, Salt Lake City, UT 84112, USA |
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| Abstract: | In this paper we derive some Fourier series and Fourier polynomial approximations to a function F which has the same zeros as the zeta function, ζ(z) on the strip {z∈C:0<Rz<1}. These approximations depend on an arbritrary positive parameter h, and which for arbitrary ε∈(0,1/2), converge uniformly to ζ(z) on the rectangle {z∈C:ε<Rz<1-ε,-π/h<Iz<π/h}. |
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| Keywords: | Riemann zeta function Zeros Fourier series Sinc methods |
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