| viXra.org > Combinatorics and Graph Theory > viXra:2012.0136 |
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| viXra.org > Combinatorics and Graph Theory > viXra:2012.0136 |
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Combinatorics and Graph Theory |
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Authors: Tai-Choon Yoon, Yina Yoon
The Riemann product formula is provided with the function $\zeta(s)$ for all complex numbers from $\int_0^\infty\frac{x^{s-1}}{e^x-1}dx$ by substituting $-x$ only partly for $x$ in the numerator, which is incorrect, because we can find even negative factorials at the same place instead of the so-called trivial zero. And for Riemann hypothesis, we may derive out $q=\frac{2n\pi}{ln(a)}$ from the complex variable $z=\pm(p+iq)$ of the Riemann zeta function, which is applicable for all positive and negative planes and complex space including $\zeta(\frac{1}{2})$.
Comments: 4 Pages. [Heading "Abstract" added by viXra Admin]
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[v1] 2020-12-18 20:43:07
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