Advances and Applications in Discrete Mathematics

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GAUSSIAN PENTANACCI NUMBERS AND POLYNOMIALS

Authors

  • B. Sivakumar

Keywords:

Pentanacci numbers, Gaussian Pentanacci numbers.

DOI:

https://doi.org/10.17654/0974165822002

Abstract

In this paper, we define the Gaussian Pentanacci sequence. We give the generating function, Binet-like formula, sum formulas and matrix representation of Pentanacci numbers. We also define Pentanacci polynomials and Gaussian Pentanacci polynomials.

Received: July 9, 2021
Revised: August 13, 2021
Accepted: October 22, 2021

References

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E. Ozkan and I. Altun, Generalized Lucas polynomials and relationship between the Fibonacci polynomials and Lucas polynomials, Comm. Algebra 47(10) (2019), 4020-4030.

E. Ozkan and M. Tastan, On Gauss Fibonacci polynomials, on Gauss Lucas polynomials and their applications, Comm. Algebra 48(3) (2020), 952-960.

A. Mustafa and A. Suleyman, k-order Gaussian Fibonacci Polynomials and applications to the coding theory, J. Discrete Math. Sci. Cryptogr. (2020), 1-18. DOI: 10.1080/09720529.2020.1816917.

D. Tasci and H. Acar, Gaussian Tetranacci numbers, Communications in Mathematics and Applications 8(3) (2017), 379-386.

Y. Soykan, Linear summing formula of generalized Pentanacci and Gaussian Pentanacci numbers, Journal of Advances in Mathematics and Computer Science 33(3) (2019), 1-14.

Y. Soykan, On generalized Pentanacci and generalized Gaussian Pentanacci numbers, Asian Research Journal of Mathematics 16(9) (2020), 102-121.

A. P. Stakhov, Fibonacci matrices a generalization of the Cassini formula and a new coding theory, Chaos Solitons Fractals 30(1) (2006), 56-66.

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Published

2021-11-23

Issue

Vol. 29 No. 1 (2022)

Section

Articles

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How to Cite

GAUSSIAN PENTANACCI NUMBERS AND POLYNOMIALS. (2021). Advances and Applications in Discrete Mathematics, 29(1), 9-23. https://doi.org/10.17654/0974165822002

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