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Sums of products of Euler-Bernoulli-Genocchi numbers. (Chinese. English summary) Zbl 1053.11509

From the text: The authors prove two summation formulas involving \[ \sum_{(\alpha_ 1+v_ 1) +\dots+(\alpha_ k+v_ k)=n}\frac {E_{2\alpha_ 1}\cdots E_{2\alpha_ k} B_{2v_ 1}\cdots B_{2v_ k}} {(2\alpha_ 1)!\cdots (2\alpha_ k)! (2v_ 1)!\cdots(2v_ k)!} \]
where \(\{B_ n\}\) and \(\{E_ n\}\) denote the Bernoulli and Euler numbers respectively.

MSC:

11B68 Bernoulli and Euler numbers and polynomials
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