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Some New Families of Special Polynomials and Numbers Associated with Finite Operators

Yılmaz Şimşek

2020Symmetry14 citationsDOIOpen Access PDF

Abstract

The aim of this study was to define a new operator. This operator unify and modify many known operators, some of which were introduced by the author. Many properties of this operator are given. Using this operator, two new classes of special polynomials and numbers are defined. Many identities and relationships are derived, including these new numbers and polynomials, combinatorial sums, the Bernoulli numbers, the Euler numbers, the Stirling numbers, the Daehee numbers, and the Changhee numbers. By applying the derivative operator to these new polynomials, derivative formulas are found. Integral representations, including the Volkenborn integral, the fermionic p-adic integral, and the Riemann integral, are given for these new polynomials.

Topics & Concepts

Stirling numberMathematicsOperator (biology)Bernoulli numberStirling numbers of the second kindOrthogonal polynomialsBernoulli polynomialsStirling numbers of the first kindPure mathematicsAlgebra over a fieldClassical orthogonal polynomialsDifference polynomialsDiscrete mathematicsGeneTranscription factorBiochemistryChemistryRepressorAdvanced Mathematical IdentitiesAdvanced Combinatorial MathematicsAnalytic Number Theory Research
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