Results 111 to 120 of about 1,331 (139)
Phase-lag mixed integral equation of a generalized symmetric potential kernel and its physical meanings in (3+1) dimensions. [PDF]
HeliyonJan AR.
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Degenerate polyexponential-Genocchi numbers and polynomials
Journal of Mathematics and Computer Science, 2020 Waseem A. Khan +2 more
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SOME IDENTITIES OF DEGENERATE GENOCCHI POLYNOMIALS
Bulletin of the Korean Mathematical Society, 2016 openaire +2 more sources
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Asymptotics of Genocchi polynomials and higher order Genocchi polynomials using residues
Afrika Matematika, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Cristina B Corcino, Roberto B Corcino
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Unified Apostol–Bernoulli, Euler and Genocchi polynomials
Computers and Mathematics With Applications, 2011 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Mehmet Ali Özarslan
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THEOREMS ON GENOCCHI POLYNOMIALS OF HIGHER ORDER ARISING FROM GENOCCHI BASIS
Taiwanese Journal of Mathematics, 2014 Recently, Kim \textit{et al.} [8] constructed a new method to obtain interesting identities related to Euler polynomials of higher order arising from Euler basis. In the present paper, we study to Genocchi polynomials of higher order arising from Genocchi basis by using the method of Kim \textit{et al}.
Serkan Araci +2 more
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Genocchi polynomials associated with the Umbral algebra
Applied Mathematics and Computation, 2011zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Yilmaz Simsek
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A NEW APPROACH TO q-GENOCCHI NUMBERS AND POLYNOMIALS [PDF]
Bulletin of the Korean Mathematical Society, 2010 Let us give some notations for \(q\)-series: \[ \left[ x\right] _{q}=\frac{1-q^{x}}{1-q}, \] \[ \left[ m\right] _{q}!=\left[ m\right] _{q}\left[ m-1\right] _{q}...\left[ m-2\right] _{q}\left[ 1\right] _{q}, \] and \[ \left(\begin{matrix} m \\ k \end{matrix}\right) _{q}=\frac{\left[ m\right] _{q}\left[ m-1\right] _{q}\left[ m-2\right] _{q}...\left[ m-k ...
Veli Kurt
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On the Hermite-Apostol-Genocchi Polynomials
AIP Conference Proceedings, 2011In this study, we introduce and investigate the Hermite‐Apostol‐Genocchi polynomials by means of a suitable generating function. We establish several interesting properties of these general polynomials. Also, we prove two theorems between 2‐dimensional Hermite polynomials and Hermite‐Apostol‐Genocchi polynomials.
Veli Kurt +5 more
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ON A GENERALIZATION OF GENOCCHI AND POLY-GENOCCHI POLYNOMIALS
Far East Journal of Mathematical Sciences (FJMS)The Genocchi numbers were introduced by the Angelo Genocchi, and have been widely studied across various fields of pure and applied mathematics. In this paper, we define three special polynomials that are generalizations of the Genocchi polynomial and numbers, and find some relationships between the probablistic Stirling numbers of the second kind ...
Jin-Woo Park, Dogyeong Yang
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