Difference between revisions of "Riemann zeta as contour integral"

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(References)
(References)
 
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==References==
 
==References==
* {{BookReference|The Zeta-Function of Riemann|1930|Edward Charles Titchmarsh|prev=Riemann zeta as integral of monomial divided by an exponential|next=Riemann zeta at integers}}: § Introduction $(4)$
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* {{BookReference|The Zeta-Function of Riemann|1930|Edward Charles Titchmarsh|prev=Riemann zeta as integral of monomial divided by an exponential|next=Riemann zeta at even integers}}: § Introduction $(4)$
  
 
[[Category:Theorem]]
 
[[Category:Theorem]]
 
[[Category:Unproven]]
 
[[Category:Unproven]]

Latest revision as of 23:42, 17 March 2017

Theorem

The following formula holds: $$\zeta(z)=-\dfrac{\Gamma(1-z)}{2\pi i} \displaystyle\int_C \dfrac{(-\xi)^{z-1}}{e^{\xi}-1} \mathrm{d}\xi,$$ where $\zeta$ is Riemann zeta, $\Gamma$ is gamma, $\pi$ is pi, $i$ is the imaginary number, $e^{\xi}$ denotes the exponential, and $C$ is a contour that begins at $\infty$ on the real axis, encircles the origin once counter-clockwise (excluding $\pm 2\pi i, \pm 4\pi i, \ldots$) and returns to the starting point.

Proof

References