## Search

Now showing items 21-30 of 121

#### Existence and uniqueness of positive and nondecreasing solutions for a class of fractional boundary value problems involving the p-Laplacian operator

(SPRINGER INTERNATIONAL PUBLISHING AG, 2015-02-11)

In this article, we investigate the existence of a solution arising from the following fractional q-difference boundary value problem by using the p-Laplacian operator: D-q(gamma)(phi(p)(D(q)(delta)y(t))) + f(t,y(t)) = 0 ...

#### On the von Staudt-Clausen's theorem related to q-Frobenius-Euler numbers

(ACADEMIC PRESS INC ELSEVIER SCIENCE, 2016-02)

In this paper, we introduce q-Frobenius-Euler numbers and derive some new properties. From those properties, we show that this number is a p-adic integer, and can be expressed by von Staudt-Clausen's theorem. We also get ...

#### Weakly Compatible Maps in Complex Valued Metric Spaces and an Application to Solve Urysohn Integral Equation

(UNIV NIS, 2016)

In this paper, we prove common fixed point theorems for a pair of mappings satisfying rational inequality. Also, we prove common fixed point theorems for weakly compatible maps, weakly compatible along with (CLR) and E.A. ...

#### On weighted q-Daehee polynomials with their applications

(Elsevier B.V., 2019-03)

In this paper, we first consider a generalization of Kim's p-adic q-integral on Z p including parameters α and β. By using this integral, we introduce the q-Daehee polynomials and numbers with weight α,β. Then, we obtain ...

#### Fractional calculus formulas for Mathieu-type series and generalized Mittag-Leffler function

(JOURNAL MATHEMATICS & COMPUTER SCIENCE-JMCS, 2020)

Fractional calculus is allowing integrals and derivatives of any positive order (the term 'fractional' kept only for historical reasons), which can be considered a branch of mathematical physics which mainly deals with ...

#### Symmetric identities of Hermite-Bernoulli polynomials and Hermite-Bernoulli numbers attached to a dirichlet character χ

(MDPI AG, 2018-12-01)

We aim to introduce arbitrary complex order Hermite-Bernoulli polynomials and Hermite-Bernoulli numbers attached to a Dirichlet character χ and investigate certain symmetric identities involving the polynomials, by mainly ...

#### Applications of fourier series and zeta functions to Genocchi polynomials

(Natural Sciences Publishing, 2018-09-01)

In this paper, we firstly consider the properties of Genocchi polynomials, Fourier series and Zeta functions. In the special cases, we see that the Fourier series yield Zeta functions. From here, we show that zeta functions ...

#### Multifarious implicit summation formulae of Hermite-based poly-Daehee polynomials

(Natural Sciences Publishing USA, 2018-03-01)

In this paper, we introduce the generating function of Hermite-based poly-Daehee numbers and polynomials. By making use of this generating function, we investigate some new and interesting identities for the Hermite-based ...

#### ON A CLASS OF MULTIPLE q-BERNOULLI, MULTIPLE q-EULER AND MULTIPLE q-GENOCCHI POLYNOMIALS OF ORDER alpha

(MILI PUBL, 2016-10)

Motivated and inspired by [11] and [9], the authors introduce a class of multiple q-Bernoulli polynomials of order., multiple q-Euler polynomials of order. and multiple q-Genocchi polynomials of order.. We also present ...

#### A Class of Generating Functions for a New Generalization of Eulerian Polynomials with their Interpolation Functions

(UNIV NIS, 2016)

Motivated by a number of recent investigations, we define and investigate the various properties of a new family of the Eulerian polynomials. We derive useful results involving these Eulerian polynomials including (for ...