Browsing by Author "Unal, Z, Tokeser, U, Bilgici, G"

Filter results by typing the first few letters
Now showing 1 - 1 of 1
  • No Thumbnail Available
    Publication
    Some Properties of Dual Fibonacci and Dual Lucas Octonions
    (2017-06-01) Ünal Z., Tokeşer Ü., Bilgici G.; Unal, Z, Tokeser, U, Bilgici, G
    Halici (Adv Appl Clifford Algebr 25(4):905–914, 2015) defined dual Fibonacci and dual Lucas octonions by the relations Q~ n= Qn+ εQn+1 and P~ n= Pn+ εPn+1 for every integer n where Qn and Pn are the Fibonacci and Lucas octonions respectively, and ε is the dual unit. The aim of this paper is to investigate properties of dual Fibonacci and dual Lucas octonions. After obtaining the Binet formulas for the sequences {Q~n}n=0∞ and {P~n}n=0∞, we derive some identities for these sequences such as Catalan’s, Cassini’s and d’Ocagne’s identities.