Results 11 to 20 of about 181 (123)

Miscellaneous Properties of Generalized Fubini Polynomials [PDF]

open access: yesCommunications in Advanced Mathematical Sciences, 2023
This article attempts to present the generalized Fubini polynomials $F_{n}(x,y,z,q)$. The results obtained here include various families of multilinear and multilateral generating functions, various properties, as well as some special cases for these ...
Muhammet Ağca, Nejla Özmen
doaj   +5 more sources

Some Identities Involving Fubini Polynomials

open access: yesMathematics
Using Hoppe’s formula, we derive two identities that relate the powers and derivatives of the generating function for Fubini polynomials. As applications, we obtain several identities involving Fubini polynomials, including identities for Sums of ...
Weiming Liu, Kuai Yu, Xiaoliang Cheng
doaj   +3 more sources

A Fubini polynomial-based generalization of Szász-Baskakov operators

open access: yesMathematical and Computer Modelling of Dynamical Systems
This work contains a generalization of the Szász-Baskakov operators with the help of Fubini polynomials. Firstly, we get the rate of convergence of our new operators and then we find some approximation results.
Melek Sofyalıoğlu Aksoy   +1 more
doaj   +3 more sources

A new class of generalized Fubini polynomials and their computational algorithms [PDF]

open access: yesApplicable Analysis and Discrete Mathematics, 2023
The aim of this paper is to give many new and elegant formulas for a new class of generalized Fubini polynomials with the aid of generating functions and their functional equations. By using these formulas, some computational algorithms involving a new class of generalized Fubini polynomials and special polynomials and numbers are constructed.
Kilar, Neslihan
core   +3 more sources

Generalized Fubini Apostol-Type Polynomials and Probabilistic Applications

open access: yesInternational Journal of Mathematics and Mathematical Sciences, 2022
The paper aims to introduce and investigate a new class of generalized Fubini-type polynomials. The generating functions, special cases, and properties are introduced.
Rabab S. Gomaa, Alia M. Magar
doaj   +2 more sources

Symmetric Identities Involving the Extended Degenerate Central Fubini Polynomials Arising from the Fermionic p-Adic Integral on p

open access: yesAxioms
Since the constructions of p-adic q-integrals, these integrals as well as particular cases have been used not only as integral representations of many special functions, polynomials, and numbers, but they also allow for deep examinations of many families
Maryam Salem Alatawi   +2 more
doaj   +2 more sources

Degenerate Derangement Polynomials and Numbers

open access: yesFractal and Fractional, 2021
In this paper, we consider a new type of degenerate derangement polynomial and number, which shall be called the degenerate derangement polynomials and numbers of the second kind.
Minyoung Ma, Dongkyu Lim
doaj   +2 more sources

A combinatorial characterization of the generalized exponential and Fubini polynomials

open access: yesOnline Journal of Analytic Combinatorics, 2021
In this paper, we show that the generalized exponential polynomials and the generalized Fubini polynomials satisfy certain binomial identities and that these identities characterize the mentioned polynomials (up to an affine transformation of the variable) among the class of the normalized Sheffer sequences.
E. Munarini
openaire   +4 more sources

Two variable higher-order central Fubini polynomials [PDF]

open access: yesJournal of Inequalities and Applications, 2019
Recently, the central Fubini polynomials were introduced in connection with central factorial numbers of the second kind. In this paper, we consider two variable higher-order central Fubini polynomials as a ‘central analogue’ of two variable higher-order
Taekyun Kim   +3 more
doaj   +3 more sources

Identities for the Hermite-Based Fubini Polynomials

open access: yes, 2020
In this paper, we define the Hermite-based Fubini type polynomials. We investigate the properties of Fubini type numbers which defined by Muresan [15]. The desire of this paper is to construct a new relations and recurrence relations for Hermite-based Fubini type numbers and polynomials. We give some identities for this polynomial.
Burak Kurt
openaire   +2 more sources

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