The gamma function considered as sum of generalized Eulerian numbers (Q1329082)
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scientific article; zbMATH DE number 597758
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The gamma function considered as sum of generalized Eulerian numbers |
scientific article; zbMATH DE number 597758 |
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The gamma function considered as sum of generalized Eulerian numbers (English)
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28 November 1994
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Let \(G_ k(z)= \sum^{k-1}_{j=0} (k-j)^{z-1}(-1)^ j{z\choose j}\). For \(n\in\mathbb{N}\) Worpitzky's formula shows that \(G_ k(n+1)\) coincides with the Eulerian number \(A(n,k)\), from which it is clear that \(\sum_{k\geq 0} G_ k(n+1)= n!\) holds. It is shown that the formula \(\sum_{k\geq 0} G_ k(z)= \Gamma(z)\) remains true for complex numbers \(z\) with positive real part.
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gamma function
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Eulerian number
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0.89778334
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0.8890756
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0.88281596
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