Some explicit formulas for the Bernoulli and Euler numbers and polynomials

We deal with -Euler numbers and -Bernoulli numbers. We derive some interesting relations for -Euler numbers and polynomials by using their generating function and derivative operator. Also, we derive relations between the -Euler numbers and -Bernoulli numbers via the -adic -integral in the -adic integer ring.

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Some Symmetry Identities for Carlitz’s Type Degenerate Twisted (p,q)-Euler Polynomials Related to Alternating Twisted (p,q)-Sums

Symmetry ◽

10.3390/sym13081371 ◽

2021 ◽

Vol 13 (8) ◽

pp. 1371

Author(s):

Cheon-Seoung Ryoo

Keyword(s):

Euler Polynomials ◽

Euler Numbers ◽

Explicit Formulas ◽

Euler Numbers And Polynomials ◽

New Form ◽

Symmetric Properties

In this paper, we define a new form of Carlitz’s type degenerate twisted (p,q)-Euler numbers and polynomials by generalizing the degenerate Euler numbers and polynomials, Carlitz’s type degenerate q-Euler numbers and polynomials. Some interesting identities, explicit formulas, symmetric properties, a connection with Carlitz’s type degenerate twisted (p,q)-Euler numbers and polynomials are obtained. Finally, we investigate the zeros of the Carlitz’s type degenerate twisted (p,q)-Euler polynomials by using computer.

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On p-Adic Fermionic Integrals of q-Bernstein Polynomials Associated with q-Euler Numbers and Polynomials †

Symmetry ◽

10.3390/sym10080311 ◽

2018 ◽

Vol 10 (8) ◽

pp. 311 ◽

Cited By ~ 2

Author(s):

Lee-Chae Jang ◽

Taekyun Kim ◽

Dae Kim ◽

Dmitry Dolgy

Keyword(s):

Bernstein Polynomials ◽

Euler Numbers ◽

Euler Numbers And Polynomials

We study a q-analogue of Euler numbers and polynomials naturally arising from the p-adic fermionic integrals on Zp and investigate some properties for these numbers and polynomials. Then we will consider p-adic fermionic integrals on Zp of the two variable q-Bernstein polynomials, recently introduced by Kim, and demonstrate that they can be written in terms of the q-analogues of Euler numbers. Further, from such p-adic integrals we will derive some identities for the q-analogues of Euler numbers.

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Some Relationships between the Analogs of Euler Numbers and Polynomials

Journal of Inequalities and Applications ◽

10.1155/2007/86052 ◽

2007 ◽

Vol 2007 (1) ◽

pp. 086052 ◽

Cited By ~ 8

Author(s):

CS Ryoo ◽

T Kim ◽

Lee-Chae Jang

Keyword(s):

Euler Numbers ◽

Euler Numbers And Polynomials

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Some Symmetric Identities for the Multiple (p, q)-Hurwitz-Euler eta Function

Symmetry ◽

10.3390/sym11050645 ◽

2019 ◽

Vol 11 (5) ◽

pp. 645 ◽

Cited By ~ 4

Author(s):

Kyung-Won Hwang ◽

Cheon Seoung Ryoo

Keyword(s):

Higher Order ◽

Complex Field ◽

Euler Numbers ◽

Euler Numbers And Polynomials ◽

Symmetric Identities ◽

Symmetric Properties

The main purpose of this paper is to find some interesting symmetric identities for the ( p , q ) -Hurwitz-Euler eta function in a complex field. Firstly, we define the multiple ( p , q ) -Hurwitz-Euler eta function by generalizing the Carlitz’s form ( p , q ) -Euler numbers and polynomials. We find some formulas and properties involved in Carlitz’s form ( p , q ) -Euler numbers and polynomials with higher order. We find new symmetric identities for multiple ( p , q ) -Hurwitz-Euler eta functions. We also obtain symmetric identities for Carlitz’s form ( p , q ) -Euler numbers and polynomials with higher order by using symmetry about multiple ( p , q ) -Hurwitz-Euler eta functions. Finally, we study the distribution and symmetric properties of the zero of Carlitz’s form ( p , q ) -Euler numbers and polynomials with higher order.

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Generalized Tepper’s Identity and Its Application

Mathematics ◽

10.3390/math8020243 ◽

2020 ◽

Vol 8 (2) ◽

pp. 243

Author(s):

Dmitry Kruchinin ◽

Vladimir Kruchinin ◽

Yilmaz Simsek

Keyword(s):

Number Theory ◽

Generating Functions ◽

Stirling Numbers ◽

Bernoulli Numbers ◽

Combinatorial Analysis ◽

Euler Numbers ◽

Bernoulli Numbers And Polynomials ◽

Euler Numbers And Polynomials

The aim of this paper is to study the Tepper identity, which is very important in number theory and combinatorial analysis. Using generating functions and compositions of generating functions, we derive many identities and relations associated with the Bernoulli numbers and polynomials, the Euler numbers and polynomials, and the Stirling numbers. Moreover, we give applications related to the Tepper identity and these numbers and polynomials.

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