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| viXra.org > Functions and Analysis > viXra:2109.0114 |
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Functions and Analysis |
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Authors: Michael C. Dickerson
Riemann's Functional equation zeta(s) has values where zeta(s) = 0 at negative even integers of s (-2,-4,-6...) when the function sin(pi*s/2) equals 0. This paper demonstrates that the only other case where zeta(s) = 0 in Riemann's functional equation is when zeta(s) = zeta(1-s) which is only true when the real part of s = 1/2.
Comments: 1 Page. Contacting author at michaeldickerson89@gmail.com [Corrections made by viXra Admin to conform with the requirements on the Submission Form]
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[v1] 2021-09-11 20:54:41
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