A new family of fubini type numbers and polynomials associated with apostol-bernoulli numbers and polynomials
Neslihan Kilar,Yilmaz Simsek +1 more
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This article is published in Journal of The Korean Mathematical Society.The article was published on 2017-01-01 and is currently open access. It has received 26 citations till now. The article focuses on the topics: Bernoulli number & Stirling number.read more
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A parametric kind of the Fubini-type polynomials
TL;DR: In this article, two specific generating functions for parametric Fubini-type polynomials are introduced and analyzed. But the relation between parametric-kind Fubinis-type and other polynomial types is not discussed.
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New construction of type 2 degenerate central Fubini polynomials with their certain properties
TL;DR: In this article, the degenerate version of the central Fubini polynomials associated with central factorial numbers of the second kind was studied and shown to be equivalent to degenerate Euler numbers.
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Symmetric Identities for Fubini Polynomials
TL;DR: A quotient of such p-adic integrals on Zp is investigated, representing generating functions of three w-torsion Fubini polynomials, and some new symmetric identities are derived.
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A Parametric Kind of the Degenerate Fubini Numbers and Polynomials
TL;DR: In this article, the authors introduce the parametric kinds of degenerate type Fubini polynomials and numbers and derive recurrence relations, identities and summation formulas with the aid of generating functions and trigonometric functions.
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Two Parametric Kinds of Eulerian-Type Polynomials Associated with Euler’s Formula
Neslihan Kilar,Yilmaz Simsek +1 more
TL;DR: Using these generating functions and the Euler’s formula, some identities and relations among trigonometric functions, two parametric kinds of Eulerian-type polynomials, Apostol- type polynmials, the Stirling numbers and Fubini-typePolynomial functions are presented.