Here we will derive formulas for expressing any polynomial as linear combinations of two kinds of higherorder Daehee polynomial basis. Then we will apply these formulas to certain polynomials in order to get new and interesting identities involving higher-order Daehee polynomials of the first kind and of the second kind
AbstractWe define the generalized potential polynomials associated to an independent variable, and p...
We give new proofs and explain the origin of several combinatorial identities of Fu and Lascoux, Dil...
In this paper, we introduce the generating function of Hermite-based poly-Daehee numbers and polynom...
Abstract: In this note, we shall give an explicit formula for the coefficients of the expansion of g...
Recently, λ-Daehee numbers and polynomials are introduced in [1]. In this paper, we obtain some prop...
Recently, Kim and Kim (Russ. J. Math. Phys. 27(2):227–235, 2020) have studied new type degenerate Be...
Abstract In the paper, the author considers the Fourier series related to higher-order Daehee and Ch...
In the present paper, we introduce a method in order to obtain some new interesting relations and id...
In this paper, we consider the higher order degenerate Changhee–Genocchi polynomials of the second k...
Abstract We give a new construction of the -Euler numbers and polynomials of higher order attached ...
Recently, Kim et al. [8] constructed a new method to obtain interesting identities related to Euler ...
In this study, we introduce modified degenerate Changhee–Genocchi polynomials of the second kind, an...
In a study, Carlitz introduced the degenerate exponential function and applied that function to Bern...
Abstract. In this paper we derive some identities on Eulerian polynomials of higher order from non-l...
Recently, Kim et al have introduced an useful method to get interesting identities related to Bernou...
AbstractWe define the generalized potential polynomials associated to an independent variable, and p...
We give new proofs and explain the origin of several combinatorial identities of Fu and Lascoux, Dil...
In this paper, we introduce the generating function of Hermite-based poly-Daehee numbers and polynom...
Abstract: In this note, we shall give an explicit formula for the coefficients of the expansion of g...
Recently, λ-Daehee numbers and polynomials are introduced in [1]. In this paper, we obtain some prop...
Recently, Kim and Kim (Russ. J. Math. Phys. 27(2):227–235, 2020) have studied new type degenerate Be...
Abstract In the paper, the author considers the Fourier series related to higher-order Daehee and Ch...
In the present paper, we introduce a method in order to obtain some new interesting relations and id...
In this paper, we consider the higher order degenerate Changhee–Genocchi polynomials of the second k...
Abstract We give a new construction of the -Euler numbers and polynomials of higher order attached ...
Recently, Kim et al. [8] constructed a new method to obtain interesting identities related to Euler ...
In this study, we introduce modified degenerate Changhee–Genocchi polynomials of the second kind, an...
In a study, Carlitz introduced the degenerate exponential function and applied that function to Bern...
Abstract. In this paper we derive some identities on Eulerian polynomials of higher order from non-l...
Recently, Kim et al have introduced an useful method to get interesting identities related to Bernou...
AbstractWe define the generalized potential polynomials associated to an independent variable, and p...
We give new proofs and explain the origin of several combinatorial identities of Fu and Lascoux, Dil...
In this paper, we introduce the generating function of Hermite-based poly-Daehee numbers and polynom...
DOI
Add to ORKG![Generalized <inline-formula> <graphic file="1029-242X-2010-682072-i1.gif"/></inline-formula>-Euler Numbers and Polynomials of Higher Order and Some Theoretic Identities](/en/item/26014086/Generalized-lessinline-formulagreater-lessgraphic-file"1029-242X-2010-682072-i1.gif"greaterlessinline-formulagreater-Euler-Numbers-and-Polynomials-of-Higher-Order-and-Some-Theoretic-Identities){kind=link}