一类新的广义高斯k-Pell-Lucas数及其多项式

IF 0.7 Q2 MATHEMATICS Communications Faculty of Sciences University of Ankara-Series A1 Mathematics and Statistics Pub Date : 2023-06-23 DOI:10.31801/cfsuasmas.1138441

Hayrullah Özimamoğlu, Ahmet Kaya

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摘要

在本文中，我们推广了已知的高斯-佩尔-卢卡斯数，并将这些数称为广义高斯k-Pell-Lucas数。我们得到了广义高斯k-Pell-Lucas数族和已知的高斯Pell-Luca数之间的关系。我们推广了已知的高斯-珀耳-卢卡斯多项式，并将这种多项式称为广义高斯k-珀耳-Lucas多项式。我们得到了广义高斯k-Pell-Lucas多项式族和已知的高斯Pell-Luca多项式族之间的关系。此外，我们以矩阵形式给出了这些数和多项式的新的推广。然后，我们得到了这些数与多项式的Cassini恒等式。

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On a new family of the generalized Gaussian k-Pell-Lucas numbers and their polynomials

In this paper, we generalize the known Gaussian Pell-Lucas numbers, and call such numbers as the generalized Gaussian k-Pell-Lucas numbers. We obtain relations between the family of the generalized Gaussian k-Pell-Lucas numbers and the known Gaussian Pell-Lucas numbers. We generalize the known Gaussian Pell-Lucas polynomials, and call such polynomials as the generalized Gaussian k-Pell-Lucas polynomials. We obtain relations between the family of the generalized Gaussian k-Pell-Lucas polynomials and the known Gaussian Pell-Lucas polynomials. In addition, we present the new generalizations of these numbers and polynomials in matrix form. Then, we get Cassini’s identities for these numbers and polynomials.

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Communications Faculty of Sciences University of Ankara-Series A1 Mathematics and Statistics MATHEMATICS-

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