In this paper, we introduced a new Gaussian Fibonacci matrix, $G^{n}$ whose elements are Gaussian Fibonacci numbers and we developed a new coding and decoding method followed from this Gaussian Fibonacci matrix, $G^{n}$. We established the relations between the code matrix elements, error detection and correction for this coding theory. Correction ability of this method is $93.33$\%.
Prasad, B. (2019). A new Gaussian Fibonacci matrices and its applications. Journal of Algebra and Related Topics, 7(1), 65-72. doi: 10.22124/jart.2019.12999.1144
MLA
B. Prasad. "A new Gaussian Fibonacci matrices and its applications". Journal of Algebra and Related Topics, 7, 1, 2019, 65-72. doi: 10.22124/jart.2019.12999.1144
HARVARD
Prasad, B. (2019). 'A new Gaussian Fibonacci matrices and its applications', Journal of Algebra and Related Topics, 7(1), pp. 65-72. doi: 10.22124/jart.2019.12999.1144
VANCOUVER
Prasad, B. A new Gaussian Fibonacci matrices and its applications. Journal of Algebra and Related Topics, 2019; 7(1): 65-72. doi: 10.22124/jart.2019.12999.1144
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