Some functional relations derived from the Lindelöf-Wirtinger expansion of the Lerch transcendent function
- Navas, L.M. 1
- Ruiz, F.J. 2
- Varona, J.L. 3
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1
Universidad de Salamanca
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2
Universidad de Zaragoza
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3
Universidad de La Rioja
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ISSN: 0025-5718
Année de publication: 2015
Volumen: 84
Número: 292
Pages: 803-813
Type: Article
D'autres publications dans: Mathematics of Computation
Résumé
The Lindelöf-Wirtinger expansion of the Lerch transcendent function implies, as a limiting case, Hurwitz's formula for the eponymous zeta function. A generalized form of Möbius inversion applies to the Lindelöf-Wirtinger expansion and also implies an inversion formula for the Hurwitz zeta function as a limiting case. The inverted formulas involve the dynamical system of rotations of the circle and yield an arithmetical functional equation.