Abstract:
The study of higher-dimensional algebraic structures has gained significant attention in recent
years. Octonions, a normed division algebra with eight dimensions, have applications in fields such as
quantum logic, special relativity and string theory. In this study, we introduce the conditional dual Lucas
octonions. Also, we investigate several important properties and characteristics of these octonions.
Firstly, we establish the algebraic structure of the conditional dual Lucas octonions, providing a
comprehensive definition and outlining their fundamental mathematical properties. Furthermore, we
obtain generating functions, the Binet formulas, Catalan's identities, and Cassini's identities of the
conditional dual Lucas octonions. Through our analysis and exploration, we contribute to the
understanding of the conditional dual Lucas octonions, shedding light on their algebraic properties. This
study ensures a comprehensive overview of the generalization of the various octonions.