On Dual Quaternions with $k-$Generalized Leonardo Components

Yıl 2023, Sayı: 44, 31 - 42, 30.09.2023

Çiğdem Zeynep Yılmaz , Gülsüm Yeliz Saçlı

https://doi.org/10.53570/jnt.1328605

Cited By: 1

Öz

In this paper, we define a one-parameter generalization of Leonardo dual quaternions, namely $k-$generalized Leonardo-like dual quaternions. We introduce the properties of $k$-generalized Leonardo-like dual quaternions, including relations with Leonardo, Fibonacci, and Lucas dual quaternions. We investigate their characteristic relations, involving the Binet-like formula, the generating function, the summation formula, Catalan-like, Cassini-like, d'Ocagne-like, Tagiuri-like, and Hornsberger-like identities. The crucial part of the present paper is that one can reduce the calculations of Leonardo-like dual quaternions by considering $k$. For $k=1$, these results are generalizations of the ones for ordered Leonardo quadruple numbers. Finally, we discuss the need for further research.

Anahtar Kelimeler

Leonardo sequence, recurrence relations, dual quaternions

Destekleyen Kurum

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Proje Numarası

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Teşekkür

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Kaynakça

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