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| viXra.org > General Mathematics > viXra:2205.0089 |
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General Mathematics |
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The Riemann hypothesis asserts that all meaningful solutions to the Riemann zeta function equation ζ(s)=0 lie on a line lying on Re(s)=1/2. This paper proves that for s=1/2+it, where t is any real number, the calculation result of the Riemann zeta function cannot be exactly zero, that is, there is no solution. Therefore,the real number t is any value, and it is not a non-trivial zero point, that is, the Riemann hypothesis is denied.
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[v1] 2022-05-17 16:46:47
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