Computers and Mathematics with Applications, ISSN 0898-1221, 2006, Volume 51, Issue 3, pp. 631 - 642

Recently, Srivastava and Pintér [1] investigated several interesting properties and relationships involving the classical as well as the generalized (or...

Euler polynomials and numbers | ernoulli polynomials and numbers | Generalized (or higher-order) Euler polynomials and numbers, Apostol-Bernoulli polynomials and numbers, Apostol-Euler polynomials and numbers, Generalized Apostol-Bernoulli polynomials and numbers, Generalized Apostol-Euler polynomials and numbers, Stirling numbers of the second kind, Generating functions, Srivastava-Pintér addition theorems, Recursion formulas | Generalized (or higher-order) Bernoulli polynomials and numbers | Generalized (or higher-order) Euler polynomials and numbers, Apostol-Bernoulli polynomials and numbers, Apostol-Euler polynomials and numbers, Generalized Apostol-Bernoulli polynomials and numbers, Generalized Apostol-Euler polynomials and numbers | Bernoulli polynomials and numbers | MATHEMATICS, APPLIED | generalized (or higher-order) Euler polynomials and numbers | stirling numbers of the second kind | generalized Apostol-Bernoulli polynomials and numbers | Srivastava-Pinter addition theorems | generating functions | generalized (or higher-order) Bernoulli polynomials and numbers | generalized Apostol-Euler polynomials and numbers | recursion formulas | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | Apostol-Euler polynomials and numbers | Apostol-Bernoulli polynomials and numbers | Mathematical models

Euler polynomials and numbers | ernoulli polynomials and numbers | Generalized (or higher-order) Euler polynomials and numbers, Apostol-Bernoulli polynomials and numbers, Apostol-Euler polynomials and numbers, Generalized Apostol-Bernoulli polynomials and numbers, Generalized Apostol-Euler polynomials and numbers, Stirling numbers of the second kind, Generating functions, Srivastava-Pintér addition theorems, Recursion formulas | Generalized (or higher-order) Bernoulli polynomials and numbers | Generalized (or higher-order) Euler polynomials and numbers, Apostol-Bernoulli polynomials and numbers, Apostol-Euler polynomials and numbers, Generalized Apostol-Bernoulli polynomials and numbers, Generalized Apostol-Euler polynomials and numbers | Bernoulli polynomials and numbers | MATHEMATICS, APPLIED | generalized (or higher-order) Euler polynomials and numbers | stirling numbers of the second kind | generalized Apostol-Bernoulli polynomials and numbers | Srivastava-Pinter addition theorems | generating functions | generalized (or higher-order) Bernoulli polynomials and numbers | generalized Apostol-Euler polynomials and numbers | recursion formulas | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | Apostol-Euler polynomials and numbers | Apostol-Bernoulli polynomials and numbers | Mathematical models

Journal Article

01/2019, ISBN 9783039216215

This Special Issue presents research papers on various topics within many different branches of mathematics, applied mathematics, and mathematical physics....

eBook

Applied Mathematics and Computation, ISSN 0096-3003, 07/2015, Volume 262, pp. 31 - 41

In this paper, we present a further investigation for the Apostol–Bernoulli polynomials and the Apostol–Genocchi polynomials. By making use of the generating...

Apostol–Genocchi numbers | Apostol–Genocchi polynomials | Apostol–Bernoulli numbers | Convolution formulas | Recurrence relations | Apostol–Bernoulli polynomials | Apostol-Genocchi numbers | Apostol-Bernoulli numbers | Apostol-Genocchi polynomials | Apostol-Bernoulli polynomials | FOURIER EXPANSIONS | MATHEMATICS, APPLIED | EXTENSIONS | NUMBERS | SUMS | SYMMETRY | PRODUCTS | EULER POLYNOMIALS | FAMILIES | MULTIPLICATION FORMULAS

Apostol–Genocchi numbers | Apostol–Genocchi polynomials | Apostol–Bernoulli numbers | Convolution formulas | Recurrence relations | Apostol–Bernoulli polynomials | Apostol-Genocchi numbers | Apostol-Bernoulli numbers | Apostol-Genocchi polynomials | Apostol-Bernoulli polynomials | FOURIER EXPANSIONS | MATHEMATICS, APPLIED | EXTENSIONS | NUMBERS | SUMS | SYMMETRY | PRODUCTS | EULER POLYNOMIALS | FAMILIES | MULTIPLICATION FORMULAS

Journal Article

Journal of Inequalities and Applications, ISSN 1025-5834, 12/2019, Volume 2019, Issue 1, pp. 1 - 15

The Changhee numbers and polynomials are introduced by Kim, Kim and Seo (Adv. Stud. Theor. Phys. 7(20):993–1003, 2013), and the generalizations of those...

Fermionic p -adic q -integral on Z p ${\mathbb{Z}}_{p} | Analysis | Mathematics, general | ( h , q ) $(h,q)$ -Euler polynomials | Mathematics | Applications of Mathematics | Degenerate ( h , q ) $(h,q)$ -Changhee polynomials | Degenerate (h, q) -Changhee polynomials | (h, q) -Euler polynomials | Fermionic p-adic q-integral on Z | Q-EULER POLYNOMIALS | INTEGRALS | MATHEMATICS | MATHEMATICS, APPLIED | HIGHER-ORDER | IDENTITIES | H | (h, q)-Euler polynomials | Q-BERNOULLI | Degenerate (h, q)-Changhee polynomials | Fermionic p-adic q-integral on Z(p) | Polynomials | Fermionic p-adic q-integral on Z p ${\mathbb{Z}}_{p}

Fermionic p -adic q -integral on Z p ${\mathbb{Z}}_{p} | Analysis | Mathematics, general | ( h , q ) $(h,q)$ -Euler polynomials | Mathematics | Applications of Mathematics | Degenerate ( h , q ) $(h,q)$ -Changhee polynomials | Degenerate (h, q) -Changhee polynomials | (h, q) -Euler polynomials | Fermionic p-adic q-integral on Z | Q-EULER POLYNOMIALS | INTEGRALS | MATHEMATICS | MATHEMATICS, APPLIED | HIGHER-ORDER | IDENTITIES | H | (h, q)-Euler polynomials | Q-BERNOULLI | Degenerate (h, q)-Changhee polynomials | Fermionic p-adic q-integral on Z(p) | Polynomials | Fermionic p-adic q-integral on Z p ${\mathbb{Z}}_{p}

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 10/2014, Volume 244, pp. 149 - 157

The main objective in this paper is first to establish new identities for the λ-Stirling type numbers of the second kind, the λ-array type polynomials, the...

Bernoulli polynomials and Bernoulli numbers | Apostol–Bernoulli polynomials and Apostol–Bernoulli numbers | [formula omitted]-Stirling numbers of the second kind | [formula omitted]-Array polynomials | [formula omitted]-Bell numbers and [formula omitted]-Bell polynomials | λ-Bell numbers and λ-Bell polynomials | λ-Array polynomials | λ-Stirling numbers of the second kind | Apostol-Bernoulli polynomials and Apostol-Bernoulli numbers | MATHEMATICS, APPLIED | lambda-Array polynomials | lambda-Stirling numbers of the second kind | lambda-Bell numbers and lambda-Bell polynomials | APOSTOL-BERNOULLI | GENERATING-FUNCTIONS | EULER

Bernoulli polynomials and Bernoulli numbers | Apostol–Bernoulli polynomials and Apostol–Bernoulli numbers | [formula omitted]-Stirling numbers of the second kind | [formula omitted]-Array polynomials | [formula omitted]-Bell numbers and [formula omitted]-Bell polynomials | λ-Bell numbers and λ-Bell polynomials | λ-Array polynomials | λ-Stirling numbers of the second kind | Apostol-Bernoulli polynomials and Apostol-Bernoulli numbers | MATHEMATICS, APPLIED | lambda-Array polynomials | lambda-Stirling numbers of the second kind | lambda-Bell numbers and lambda-Bell polynomials | APOSTOL-BERNOULLI | GENERATING-FUNCTIONS | EULER

Journal Article

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 2006, Volume 324, Issue 2, pp. 790 - 804

In this paper, by using q-Volkenborn integral, we construct new generating functions of the new twisted ( h , q ) -Bernoulli polynomials and numbers. By...

Twisted q-zeta function | q-Volkenborn integral | q-Bernoulli numbers and polynomials | Twisted q-Bernoulli numbers and polynomials | q-zeta function | Twisted q- L-functions | L-function | Twisted q-L-functions | Q-ANALOG | MATHEMATICS | twisted q-L-functions | MATHEMATICS, APPLIED | SERIES | twisted q-zeta function | twisted q-Bernoulli numbers and polynomials | Q-ZETA FUNCTIONS

Twisted q-zeta function | q-Volkenborn integral | q-Bernoulli numbers and polynomials | Twisted q-Bernoulli numbers and polynomials | q-zeta function | Twisted q- L-functions | L-function | Twisted q-L-functions | Q-ANALOG | MATHEMATICS | twisted q-L-functions | MATHEMATICS, APPLIED | SERIES | twisted q-zeta function | twisted q-Bernoulli numbers and polynomials | Q-ZETA FUNCTIONS

Journal Article

Advances in Difference Equations, ISSN 1687-1839, 12/2015, Volume 2015, Issue 1, pp. 1 - 9

The p-adic q-integral (sometimes called q-Volkenborn integration) was defined by Kim. From p-adic q-integral equations, we can derive various q-extensions of...

(h, q)-Daehee numbers | p-adic q-integral | (h, q)-Bernoulli polynomials | (h, q)-Daehee polynomials | MATHEMATICS | MATHEMATICS, APPLIED | Q-BERNOULLI NUMBERS | DAEHEE | Integral equations | Analysis | Polynomials | Texts | Difference equations | Mathematical analysis

(h, q)-Daehee numbers | p-adic q-integral | (h, q)-Bernoulli polynomials | (h, q)-Daehee polynomials | MATHEMATICS | MATHEMATICS, APPLIED | Q-BERNOULLI NUMBERS | DAEHEE | Integral equations | Analysis | Polynomials | Texts | Difference equations | Mathematical analysis

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2013, Volume 2013, Issue 1, pp. 1 - 28

The first aim of this paper is to construct new generating functions for the generalized λ-Stirling type numbers of the second kind, generalized array type...

Mathematical and Computational Biology | Euler polynomials | generating function | generalized Frobenius Euler polynomials | Mathematics | Topology | normalized polynomials | Apostol Bernoulli polynomials | functional equation | Analysis | array polynomials | Mathematics, general | Bernoulli polynomials | Applications of Mathematics | Differential Geometry | Stirling numbers of the second kind | Generating function | Normalized polynomials | Functional equation | Generalized Frobenius Euler polynomials | Array polynomials | REPRESENTATIONS | Q-EXTENSIONS | MATHEMATICS | ZETA | FAMILIES | APOSTOL-BERNOULLI | MULTIPLICATION FORMULAS | Technology application | Fixed point theory | Usage | Convergence (Mathematics) | Euler angles | Mathematics - Number Theory

Mathematical and Computational Biology | Euler polynomials | generating function | generalized Frobenius Euler polynomials | Mathematics | Topology | normalized polynomials | Apostol Bernoulli polynomials | functional equation | Analysis | array polynomials | Mathematics, general | Bernoulli polynomials | Applications of Mathematics | Differential Geometry | Stirling numbers of the second kind | Generating function | Normalized polynomials | Functional equation | Generalized Frobenius Euler polynomials | Array polynomials | REPRESENTATIONS | Q-EXTENSIONS | MATHEMATICS | ZETA | FAMILIES | APOSTOL-BERNOULLI | MULTIPLICATION FORMULAS | Technology application | Fixed point theory | Usage | Convergence (Mathematics) | Euler angles | Mathematics - Number Theory

Journal Article

Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales. Serie A. Matemáticas, ISSN 1578-7303, 4/2017, Volume 111, Issue 2, pp. 435 - 446

Recently, several authors have studied the degenerate Bernoulli and Euler polynomials and given some intersting identities of those polynomials. In this paper,...

11B83 | Degenerate Bell numbers and polynomials | Theoretical, Mathematical and Computational Physics | 11B73 | Mathematics, general | 05A19 | Mathematics | Degenerate Stirling numbers of the second kind | Applications of Mathematics | 11B37 | MATHEMATICS | BERNOULLI NUMBERS

11B83 | Degenerate Bell numbers and polynomials | Theoretical, Mathematical and Computational Physics | 11B73 | Mathematics, general | 05A19 | Mathematics | Degenerate Stirling numbers of the second kind | Applications of Mathematics | 11B37 | MATHEMATICS | BERNOULLI NUMBERS

Journal Article

Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales. Serie A. Matemáticas, ISSN 1578-7303, 7/2019, Volume 113, Issue 3, pp. 2913 - 2920

Here we consider the degenerate Bernstein polynomials as a degenerate version of Bernstein polynomials, which are motivated by Simsek’s recent work ‘Generating...

11B83 | Theoretical, Mathematical and Computational Physics | Degenerate Bernstein polynomials | Generating functions | Mathematics, general | Mathematics | Bernoulli polynomials | Applications of Mathematics | Stirling numbers | MATHEMATICS | Mathematical analysis | Polynomials | Combinatorial analysis

11B83 | Theoretical, Mathematical and Computational Physics | Degenerate Bernstein polynomials | Generating functions | Mathematics, general | Mathematics | Bernoulli polynomials | Applications of Mathematics | Stirling numbers | MATHEMATICS | Mathematical analysis | Polynomials | Combinatorial analysis

Journal Article

Journal of the Korean Mathematical Society, ISSN 0304-9914, 2017, Volume 54, Issue 5, pp. 1605 - 1621

The purpose of this paper is to construct a new family of the special numbers which are related to the Fubini type numbers and the other well-known special...

Gen-erating functions | Combinatorial sum | Frobenius-Euler numbers | Bernoulli numbers | Binomial coefficients | Functional equations | Fubini numbers | Stirling numbers | Apostol-Bernoulli numbers | Apostol-Bernoulli polynomials | MATHEMATICS, APPLIED | IDENTITIES | binomial coefficients | generating functions | UNIFIED PRESENTATION | combinatorial sum | MATHEMATICS | ZETA | functional equations | ApostolBernoulli polynomials | UNIFICATION | EULER

Gen-erating functions | Combinatorial sum | Frobenius-Euler numbers | Bernoulli numbers | Binomial coefficients | Functional equations | Fubini numbers | Stirling numbers | Apostol-Bernoulli numbers | Apostol-Bernoulli polynomials | MATHEMATICS, APPLIED | IDENTITIES | binomial coefficients | generating functions | UNIFIED PRESENTATION | combinatorial sum | MATHEMATICS | ZETA | functional equations | ApostolBernoulli polynomials | UNIFICATION | EULER

Journal Article

Advances in Difference Equations, ISSN 1687-1839, 12/2014, Volume 2014, Issue 1, pp. 1 - 9

We consider the Witt-type formula for the nth twisted Daehee numbers and polynomials and investigate some properties of those numbers and polynomials. In...

Bernoulli numbers of the second kind | Ordinary Differential Equations | Functional Analysis | Analysis | higher-order Bernoulli numbers | Difference and Functional Equations | Mathematics, general | Mathematics | Partial Differential Equations | the n th twisted Daehee numbers and polynomials | Higher-order Bernoulli numbers | The nth twisted Daehee numbers and polynomials | MATHEMATICS | MATHEMATICS, APPLIED | the nth twisted Daehee numbers and polynomials | Usage | Polynomials | Number theory | Difference equations | Formulas (mathematics)

Bernoulli numbers of the second kind | Ordinary Differential Equations | Functional Analysis | Analysis | higher-order Bernoulli numbers | Difference and Functional Equations | Mathematics, general | Mathematics | Partial Differential Equations | the n th twisted Daehee numbers and polynomials | Higher-order Bernoulli numbers | The nth twisted Daehee numbers and polynomials | MATHEMATICS | MATHEMATICS, APPLIED | the nth twisted Daehee numbers and polynomials | Usage | Polynomials | Number theory | Difference equations | Formulas (mathematics)

Journal Article

Axioms, ISSN 2075-1680, 10/2019, Volume 8, Issue 4, p. 112

The aim of this paper is to construct generating functions for new families of combinatorial numbers and polynomials. By using these generating functions with...

cauchy numbers | binomial coefficients | bernstein basis functions | bernoulli numbers | daehee numbers and polynomials | generating functions | euler numbers | stirling numbers | poisson-charlier polynomials | bell polynomials | functional equations | p-adic integral | special numbers and polynomials | probability distribution | partial differential equations | combinatorial sums

cauchy numbers | binomial coefficients | bernstein basis functions | bernoulli numbers | daehee numbers and polynomials | generating functions | euler numbers | stirling numbers | poisson-charlier polynomials | bell polynomials | functional equations | p-adic integral | special numbers and polynomials | probability distribution | partial differential equations | combinatorial sums

Journal Article

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 2005, Volume 308, Issue 1, pp. 290 - 302

The main object of this paper is to give analogous definitions of Apostol type (see [T.M. Apostol, On the Lerch Zeta function, Pacific J. Math. 1 (1951)...

Apostol–Euler polynomials of higher order | Hurwitz–Lerch and Lipschitz–Lerch Zeta functions | Hurwitz (or generalized) Zeta function | Apostol–Bernoulli polynomials | Apostol–Bernoulli polynomials of higher order | Bernoulli polynomials | Apostol–Euler polynomials | Gaussian hypergeometric function | Stirling numbers of the second kind | Lerch's functional equation | Hurwitz-Lerch and Lipschitz-Lerch Zeta functions | Apostol-Bernoulli polynomials of higher order | Apostol-Euler polynomials | Apostol-Euler polynomials of higher order | Apostol-Bernoulli polynomials | MATHEMATICS, APPLIED | stirling numbers of the second kind | Apostol-Bemoulli polynomials | MATHEMATICS | EXPLICIT FORMULA | RATIONAL ARGUMENTS | Apostol-Bemoulli polynomials of higher order

Apostol–Euler polynomials of higher order | Hurwitz–Lerch and Lipschitz–Lerch Zeta functions | Hurwitz (or generalized) Zeta function | Apostol–Bernoulli polynomials | Apostol–Bernoulli polynomials of higher order | Bernoulli polynomials | Apostol–Euler polynomials | Gaussian hypergeometric function | Stirling numbers of the second kind | Lerch's functional equation | Hurwitz-Lerch and Lipschitz-Lerch Zeta functions | Apostol-Bernoulli polynomials of higher order | Apostol-Euler polynomials | Apostol-Euler polynomials of higher order | Apostol-Bernoulli polynomials | MATHEMATICS, APPLIED | stirling numbers of the second kind | Apostol-Bemoulli polynomials | MATHEMATICS | EXPLICIT FORMULA | RATIONAL ARGUMENTS | Apostol-Bemoulli polynomials of higher order

Journal Article

Journal of Number Theory, ISSN 0022-314X, 12/2017, Volume 181, pp. 117 - 146

The main motivation of this paper is to investigate some derivative properties of the generating functions for the numbers Yn(λ) and the polynomials Yn(x;λ),...

Hypergeometric functions | Apostol–Bernoulli numbers and Apostol–Bernoulli polynomials | Humbert polynomials | Partial differential equations | Binomial coefficients | Generating functions | Apostol–Euler numbers and Apostol–Bernoulli polynomials | Daehee and Changhee numbers | Hurwitz–Lerch zeta functions | Cauchy numbers | Stirling numbers of the first kind | Functional equations | Lucas numbers | Hurwitz Lerch zeta functions | BERNOULLI NUMBERS | UNIFIED PRESENTATION | Apostol-Bernoulli polynomials | MATHEMATICS | Apostol-Euler numbers and | EULER POLYNOMIALS | Apostol-Bernoulli numbers and | 2ND KIND | FORMULAS | Medicine, Experimental | Medical research | Medical colleges | Statistics | Differential equations

Hypergeometric functions | Apostol–Bernoulli numbers and Apostol–Bernoulli polynomials | Humbert polynomials | Partial differential equations | Binomial coefficients | Generating functions | Apostol–Euler numbers and Apostol–Bernoulli polynomials | Daehee and Changhee numbers | Hurwitz–Lerch zeta functions | Cauchy numbers | Stirling numbers of the first kind | Functional equations | Lucas numbers | Hurwitz Lerch zeta functions | BERNOULLI NUMBERS | UNIFIED PRESENTATION | Apostol-Bernoulli polynomials | MATHEMATICS | Apostol-Euler numbers and | EULER POLYNOMIALS | Apostol-Bernoulli numbers and | 2ND KIND | FORMULAS | Medicine, Experimental | Medical research | Medical colleges | Statistics | Differential equations

Journal Article

Mediterranean Journal of Mathematics, ISSN 1660-5446, 06/2017, Volume 14, Issue 3, p. 1

The aim of this paper is to give generating functions and to prove various properties for some new families of special polynomials and numbers. Several...

Bernoulli polynomials and numbers | Euler polynomials and numbers | Humbert polynomials | Genocchi polynomials | Generating function | Apostol–Euler polynomials and numbers | Apostol–Bernoulli polynomials and numbers | Fibonacci polynomials | Stirling numbers | MATHEMATICS, APPLIED | UNIFIED PRESENTATION | BERNOULLI | MATHEMATICS | Apostol-Euler polynomials and numbers | FAMILIES | Apostol-Bernoulli polynomials and numbers | EULER

Bernoulli polynomials and numbers | Euler polynomials and numbers | Humbert polynomials | Genocchi polynomials | Generating function | Apostol–Euler polynomials and numbers | Apostol–Bernoulli polynomials and numbers | Fibonacci polynomials | Stirling numbers | MATHEMATICS, APPLIED | UNIFIED PRESENTATION | BERNOULLI | MATHEMATICS | Apostol-Euler polynomials and numbers | FAMILIES | Apostol-Bernoulli polynomials and numbers | EULER

Journal Article

Journal of Number Theory, ISSN 0022-314X, 06/2019, Volume 199, pp. 389 - 402

We study the higher-order Euler polynomials and give the corresponding monic orthogonal polynomials, which are the Meixner–Pollaczek polynomials with certain...

Generalized Motzkin number | Higher-order Euler polynomials | Orthogonal polynomial | Meixner–Pollaczek polynomial | MATHEMATICS | BERNOULLI | Meixner-Pollaczek polynomial

Generalized Motzkin number | Higher-order Euler polynomials | Orthogonal polynomial | Meixner–Pollaczek polynomial | MATHEMATICS | BERNOULLI | Meixner-Pollaczek polynomial

Journal Article

Journal of Inequalities and Applications, ISSN 1025-5834, 12/2018, Volume 2018, Issue 1, pp. 1 - 13

The purpose of this paper is to give identities and relations including the Milne–Thomson polynomials, the Hermite polynomials, the Bernoulli numbers, the...

Generating function | 05A10 | Functional equation | Euler numbers and polynomials | Mathematics | Array polynomials | Stirling numbers | 11B68 | Cauchy numbers | Milne–Thomson polynomials | Central factorial numbers | p -adic integral | 11B83 | Analysis | Mathematics, general | Bernoulli numbers and polynomials | Applications of Mathematics | Hermite polynomials | Special functions | 05A15 | p-adic integral | MATHEMATICS, APPLIED | BERNOULLI | MATHEMATICS | Milne-Thomson polynomials | EULER | Combinatorial analysis | Research

Generating function | 05A10 | Functional equation | Euler numbers and polynomials | Mathematics | Array polynomials | Stirling numbers | 11B68 | Cauchy numbers | Milne–Thomson polynomials | Central factorial numbers | p -adic integral | 11B83 | Analysis | Mathematics, general | Bernoulli numbers and polynomials | Applications of Mathematics | Hermite polynomials | Special functions | 05A15 | p-adic integral | MATHEMATICS, APPLIED | BERNOULLI | MATHEMATICS | Milne-Thomson polynomials | EULER | Combinatorial analysis | Research

Journal Article

Communications of the Korean Mathematical Society, ISSN 1225-1763, 2018, Volume 33, Issue 2, pp. 651 - 669

Journal Article

20.
Full Text
A note on the values of weighted q-Bernstein polynomials and weighted q-Genocchi numbers

Advances in Difference Equations, ISSN 1687-1839, 12/2015, Volume 2015, Issue 1, pp. 1 - 9

The rapid development of q-calculus has led to the discovery of new generalizations of Bernstein polynomials and Genocchi polynomials involving q-integers. The...

q -Bernstein polynomials | weighted q -Genocchi numbers and polynomials | 05A10 | 11B65 | Mathematics | 11B68 | Bernstein polynomials | weighted q -Bernstein polynomials | Ordinary Differential Equations | Functional Analysis | Genocchi numbers and polynomials | Analysis | 11B73 | Difference and Functional Equations | Mathematics, general | q -Genocchi numbers and polynomials | Partial Differential Equations | q-Genocchi numbers and polynomials | weighted q-Genocchi numbers and polynomials | q-Bernstein polynomials | weighted q-Bernstein polynomials | MATHEMATICS | MATHEMATICS, APPLIED | IDENTITIES | EULER POLYNOMIALS | BERNOULLI | Polynomials | Integral equations | Weighting (Statistics) | Functions (mathematics) | Difference equations | Integrals | Mathematical analysis | Texts | Representations | Combinatorial analysis

q -Bernstein polynomials | weighted q -Genocchi numbers and polynomials | 05A10 | 11B65 | Mathematics | 11B68 | Bernstein polynomials | weighted q -Bernstein polynomials | Ordinary Differential Equations | Functional Analysis | Genocchi numbers and polynomials | Analysis | 11B73 | Difference and Functional Equations | Mathematics, general | q -Genocchi numbers and polynomials | Partial Differential Equations | q-Genocchi numbers and polynomials | weighted q-Genocchi numbers and polynomials | q-Bernstein polynomials | weighted q-Bernstein polynomials | MATHEMATICS | MATHEMATICS, APPLIED | IDENTITIES | EULER POLYNOMIALS | BERNOULLI | Polynomials | Integral equations | Weighting (Statistics) | Functions (mathematics) | Difference equations | Integrals | Mathematical analysis | Texts | Representations | Combinatorial analysis

Journal Article

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