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Fourier expansions and integral representations for the Apostol-Bernoulli and Apostol-Euler polynomials
Abstract: Abstract. We investigate Fourier expansions for the Apostol-Bernoulli and Apostol-Euler polynomials using the Lipschitz summation formula and obtain their integral representations. We give some explicit formulas at rational arguments for these polynomials in terms of the Hurwitz zeta function. We also derive the integral representations for the classical Bernoulli and Euler polynomials and related known results.
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Cited by 70 publications
(64 citation statements)
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“…The results obtained generalize those in [2,6,8]. These are interesting results both from the theoretical and computational point of view, as they allow the use of Fourier approximation to both calculate and derive further relations between the various polynomial families involved.…”
Section: Introductionsupporting
confidence: 69%
“…The results obtained generalize those in [2,6,8]. These are interesting results both from the theoretical and computational point of view, as they allow the use of Fourier approximation to both calculate and derive further relations between the various polynomial families involved.…”
Section: Introductionsupporting
confidence: 69%
“…(1.6) Remark 1.4. Luo's proof [4], for Theorems 1.1 and 1.2, uses the Lipschitz summation formula [2] which is not easy to understand. In this paper we propose a very simple proof.…”
Section: Introduction and Statement Of Main Resultsmentioning
confidence: 99%
“…Luo [29,31] derived some multiplication formulas for the Apostol-Bernoulli polynomials and the Apostol-Genocchi polynomials. Further, Luo [28,30] gave the Fourier expansions for the Apostol-Bernoulli polynomials and the Apostol-Genocchi polynomials by applying the Lipschitz summation formula and obtained some explicit formulas at rational arguments for these polynomials in terms of the Hurwitz (or generalized) zeta function. Tremblay et al [47] investigated a new class of generalized Apostol-Bernoulli polynomials and obtained a generalization of the Srivastava-Pintér addition theorem (see [46]).…”
Section: 3)mentioning
confidence: 99%
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