Results 221 to 230 of about 2,037 (242)
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The Euler–Frobenius Polynomials
2014The Euler–Frobenius polynomials have been throughout the book to characterize asymptotic sampling zeros in discrete models as the sampling period goes to zero. This chapter presents a brief historical account of these polynomials, and a summary of (equivalent) definitions and properties found in the literature.
Juan I. Yuz, Graham C. Goodwin
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Bernoulli and Euler Polynomials in Clifford Analysis
Advances in Applied Clifford Algebras, 2014zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Hassan, G. F., Aloui, L.
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A Simple Generalization of Euler Numbers and Polynomials
Journal of the Indian Mathematical Society, 2018In this article, we shall consider a generalization of Euler's numbers and polynomials based on modifying the corresponding generating function. We shall prove some recurrence relations, an explicit formula, and multiplicative properties of the generalized numbers.
Hassen, Abdul, Ernst, Christopher R.
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ON THE GENERALIZED EULER POLYNOMIALS OF THE SECOND KIND
Journal of applied mathematics & informatics, 2013The authors define generalized Euler numbers and polynomials of the second kind as follows: \[ \left(\frac{2e^t}{e^{2t}+1}\right)^x=\sum_{n=0}^\infty \tilde{\mathcal E_n}(x)\frac{t^n}{n!}\qquad (| t|
Kim, Y. H., Jung, H. Y., Ryoo, C. S.
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Euler's Theorem for Polynomials
Mathematics Magazine, 1992(1992). Euler's Theorem for Polynomials. Mathematics Magazine: Vol. 65, No. 5, pp. 334-335.
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ON THE TWISTED MODIFIED DEGENERATE EULER POLYNOMIALS
Far East Journal of Mathematical Sciences (FJMS), 2016Summary: The main objective of this paper is to consider twisted modified degenerate Euler polynomials arising from \(p\)-adic fermionic integral on \(\mathbb Z_p\). We obtain some properties and establish certain identities for twisted modified degenerate Euler polynomials.
Kwon, Jongkyum +2 more
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Identities for the Bernoulli and Euler numbers and polynomials.
Ars Comb., 2012Summary: In this paper, we investigate some interesting identities on the Euler numbers and polynomials arising from their generating functions and difference operators. Finally, we give some properties of Bernoulli and Euler polynomials by using \(p\)-adic integral on \(\mathbb Z_p\).
Taekyun Kim 0001 +3 more
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Some Identities for Euler and Bernoulli Polynomials and Their Zeros
Axioms, 2018Taekyun Kim +2 more
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A Note on Degenerate Euler and Bernoulli Polynomials of Complex Variable
Symmetry, 2019Dae Kim, Taekyun Kim, Hyunseok Lee
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