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Construction of a new family of Fubini-type polynomials and its applications

H. M. Srivastava, Rekha Srivastava, Abdulghani Muhyi, Ghazala Yasmin, Hibah Islahi, Serkan Aracı

2021Advances in Difference Equations18 citationsDOIOpen Access PDF

Abstract

Abstract This paper gives an overview of systematic and analytic approach of operational technique involves to study multi-variable special functions significant in both mathematical and applied framework and to introduce new families of special polynomials. Motivation of this paper is to construct a new class of generalized Fubini-type polynomials of the parametric kind via operational view point. The generating functions, differential equations, and other properties for these polynomials are established within the context of the monomiality principle. Using the generating functions, various interesting identities and relations related to the generalized Fubini-type polynomials are derived. Further, we obtain certain partial derivative formulas including the generalized Fubini-type polynomials. In addition, certain members belonging to the aforementioned general class of polynomials are considered. The numerical results to calculate the zeros and approximate solutions of these polynomials are given and their graphical representation are shown.

Topics & Concepts

Fubini's theoremMathematicsClassical orthogonal polynomialsOrthogonal polynomialsDifference polynomialsDiscrete orthogonal polynomialsAlgebra over a fieldType (biology)Wilson polynomialsHahn polynomialsKoornwinder polynomialsPure mathematicsGegenbauer polynomialsEcologyBiologyAdvanced Mathematical IdentitiesMathematical functions and polynomialsMathematical Inequalities and Applications
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