On a new one-parameter generalization of dual-complex Jacobsthal numbers

On a new one-parameter generalization of dual-complex Jacobsthal numbers

In this paper we define dual-complex numbers with generalized Jacobsthal coefficients. We introduce one-parameter generalization of dual-complex Jacobsthal numbers - dual-complex r-Jacobsthal numbers. We investigate some algebraic properties of introduced numbers, among others Binet type formula, Ca...

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Bibliographic Details
Main Authors: Bród Dorota, Szynal-Liana Anetta, Włoch Iwona
Format: Article
Language:English
Published: Sciendo 2021-08-01
Series:Acta Universitatis Sapientiae: Mathematica
Subjects:
jacobsthal numbers
dual-complex numbers
dual-complex jacobsthal numbers
binet formula
catalan identity
cassini identity
11b37
11b39
Online Access:https://doi.org/10.2478/ausm-2021-0007
Description
Summary:In this paper we define dual-complex numbers with generalized Jacobsthal coefficients. We introduce one-parameter generalization of dual-complex Jacobsthal numbers - dual-complex r-Jacobsthal numbers. We investigate some algebraic properties of introduced numbers, among others Binet type formula, Catalan, Cassini, d’Ocagne and Honsberger type identities. Moreover, we present the generating function, summation formula and matrix generator for these numbers. The results are generalization of the properties for the dual-complex Jacobsthal numbers.
ISSN:2066-7752

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