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Toplam kayıt 13, listelenen: 1-10
Remarks on recurrence formulas for the Apostol-type numbers and polynomials
(Jangjeon Mathematical Society, 2018)
In this paper, by differentiating the generating functions for one of the family of the Apostol-type numbers and polynomials with respect to their parameters, we present some partial differential equations including these ...
Analysis of higher-order peters-type combinatorial numbers and polynomials by their generating functions and p-adic integration
(American Institute of Physics Inc., 2020)
The aim of this paper is to analyze higher-order Peters-type combinatorial numbers and polynomials by means of their generating functions and p-adic integration. By using generating functions we first obtain a combinatorial ...
Derivative formulas related to unification of generating functions for sheffer type sequences
(Amer Inst Physics, 2019)
The main aim of this paper is to present partial derivative formulas for an unification, which was introduced by the author in "Unification of the generating functions for Sheffer type sequences and their applications, ...
Some new identities and formulas for higher-order combinatorial-type numbers and polynomials
(Univ Nis, Fac Sci Math, 2020)
The main purpose of this paper is to provide various identities and formulas for higher-order combinatorial-type numbers and polynomials with the help of generating functions and their both functional equations and derivative ...
Generating functions for new families of combinatorial numbers and polynomials: Approach to poisson-charlier polynomials and probability distribution function
(Mdpi, 2019)
The aim of this paper is to construct generating functions for new families of combinatorial numbers and polynomials. By using these generating functions with their functional and differential equations, we not only ...
Identities and derivative formulas for the combinatorial and apostol-euler type numbers by their generating functions
(Univ Nis, Fac Sci Math, 2018)
The first aim of this paper is to give identities and relations for a new family of the combinatorial numbers and the Apostol-Euler type numbers of the second kind, the Stirling numbers, the Apostol-Bernoulli type numbers, ...
Numerical evaluation of special power series including the numbers of Lyndon words: an approach to interpolation functions for apostol-type numbers and polynomials
(Kent State University, 2018)
Because the Lyndon words and their numbers have practical applications in many different disciplines such as mathematics, probability, statistics, computer programming, algorithms, etc., it is known that not only mathematicians ...
Identities for dirichlet and lambert-type series arising from the numbers of a certain special word
(Univ Belgrade, Fac Electrical Engineering, 2019)
The goal of this paper is to give several new Dirichlet-type series associated with the Riemann zeta function, the polylogarithm function, and also the numbers of necklaces and Lyndon words. By applying Dirichlet convolution ...
Computation of k-ary Lyndon words using generating functions and their differential equations
(Univ Nis, Fac Sci Math, 2018)
By using generating functions technique, we investigate some properties of the k-ary Lyndon words. We give an explicit formula for the generating functions including not only combinatorial sums, but also hypergeometric ...
On a family of special numbers and polynomials associated with apostol-type numbers and poynomials and combinatorial numbers
(Univ Belgrade, Fac Electrical Engineering, 2019)
In this article, we examine a family of some special numbers and polynomials not only with their generating functions, but also with computation algorithms for these numbers and polynomials. By using these algorithms, we ...