Construction of dual-generalized complex Fibonacci and Lucas quaternions

Küçük Resim

Dosyalar

4706-PDF file-18512-1-10-20221202.pdf (145.34 KB)

Tarih

2022

Yazarlar

Dergi Başlığı

Dergi ISSN

Cilt Başlığı

Yayıncı

VASYL STEFANYK PRECARPATHIAN NATL UNIV, VUL SHEVCHENKA 57, IVANO-FRANKIVSK 76018, UKRAINE

Erişim Hakkı

info:eu-repo/semantics/openAccess
Attribution-NonCommercial-NoDerivs 3.0 United States

Özet

The aim of this paper is to construct dual-generalized complex Fibonacci and Lucas quaternions. It examines the properties both as dual-generalized complex number and as quaternion. Additionally, general recurrence relations, Binet’s formulas, Tagiuri’s (or Vajda’s like), Honsberger’s, d’Ocagne’s, Cassini’s and Catalan’s identities are obtained. A series of matrix representations of these special quaternions is introduced. Finally, the multiplication of dual-generalized complex Fibonacci and Lucas quaternions are also expressed as their different matrix representations.

Açıklama

Anahtar Kelimeler

quaternion, dual-generalized complex number, Fibonacci number, Lucas number

Kaynak

Carpathian Mathematical Publications

WoS Q Değeri

N/A

Scopus Q Değeri

Q2

Cilt

14

Sayı

2

Künye

Bağlantı

https://hdl.handle.net/11363/5686
 https://doi.org/

Koleksiyon

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