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On a new family of gauss k-Lucas numbers and their polynomials

Engi̇n Özkan, Merve Taştan

2020Asian-European Journal of Mathematics18 citationsDOI

Abstract

In this paper, we define a new family of Gauss [Formula: see text]-Lucas numbers. We give the relationships between the family of the Gauss [Formula: see text]-Lucas numbers and the known Gauss Lucas numbers. We also define the generalized polynomials for these numbers. We obtain some interesting properties of the polynomials. We also give the relationships between the generalized Gauss [Formula: see text]-Lucas polynomials and the known Gauss Lucas polynomials. Furthermore, we find new generalizations of these families and the polynomials in matrix representation. Then we prove Cassini’s identities for the families and their polynomials.

Topics & Concepts

MathematicsWilson polynomialsGaussOrthogonal polynomialsDifference polynomialsClassical orthogonal polynomialsDiscrete orthogonal polynomialsLucas numberCombinatoricsLucas sequenceRepresentation (politics)Fibonacci polynomialsAlgebra over a fieldPure mathematicsDiscrete mathematicsPhysicsPoliticsQuantum mechanicsLawFibonacci numberPolitical scienceAdvanced Mathematical Theories and ApplicationsBiofield Effects and Biophysics
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