k-order Gaussian Fibonacci polynomials and applications to the coding/decoding theory

In this paper we define k-order Gaussian Fibonacci polynomials with boundary conditions and give the generating function, explicit formula and some identities for k-order Gaussian Fibonacci polynomials. We introduce the matrix represent and we obtain the k-order Gaussian Fibonacci Polynomials matrix...

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Veröffentlicht in:Journal of discrete mathematical sciences & cryptography Jg. 25; H. 5; S. 1399 - 1416
Hauptverfasser: Asci, Mustafa, Aydinyuz, Suleyman
Format: Journal Article
Sprache:Englisch
Veröffentlicht: Taylor & Francis 04.07.2022
Schlagworte:
Coding/decoding method
Fibonacci numbers
Fibonacci polynomials
Gaussian Fibonacci numbers
k-order Gaussian Fibonacci numbers
k-order Gaussian Fibonacci polynomial coding/decoding theory
k-order Gaussian Fibonacci Polynomials
ISSN:0972-0529, 2169-0065
Online-Zugang:Volltext
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Zusammenfassung:In this paper we define k-order Gaussian Fibonacci polynomials with boundary conditions and give the generating function, explicit formula and some identities for k-order Gaussian Fibonacci polynomials. We introduce the matrix represent and we obtain the k-order Gaussian Fibonacci Polynomials matrix. We define a new coding theory called k-order Gaussian Fibonacci Polynomials coding theory and establish the code elements for values of k. This coding/decoding method bound to the Q k (x), R k (x) and E k,n (x) matrices. So, this method is different from the classical algebraic coding. Consequently, with this method, we move the coding theory onto a complex space which is a different field. Therefore, new working areas are created.
ISSN:0972-0529
2169-0065
DOI:10.1080/09720529.2020.1816917