Some Results on Gaussian Leonardo P Numbers

Mustafa Asci; Mustafa Yilmaz

Turkish Journal of Analysis and Number Theory. 2025, 13(1), 1-4
DOI: 10.12691/tjant-13-1-1

Open AccessArticle

Some Results on Gaussian Leonardo P Numbers

Mustafa Asci¹ and Mustafa Yilmaz^1,

¹Pamukkale University, Department of Mathematics, Denizli, Turkey

Pub. Date: March 26, 2025

View Full Text Full Text PDF (115 KB) Full Text ePUB(205 KB)

Cite this paper:
Mustafa Asci and Mustafa Yilmaz. Some Results on Gaussian Leonardo P Numbers. Turkish Journal of Analysis and Number Theory. 2025; 13(1):1-4. doi: 10.12691/tjant-13-1-1

Abstract

In this paper, we define the Gaussian Leonardo p numbers and we examine sum formula of the Gaussian Leonardo p numbers and then we define Q matrix of the Gaussian Leonardo p numbers. Also we give Binet formula of these numbers. We give the Gaussian Leonardo p numbers relations with the Leonardo p numbers and the Fibonacci p numbers.

Keywords:
Leonardo numbers Gaussian Leonardo numbers Leonardo p numbers

This work is licensed under a Creative Commons Attribution 4.0 International License. To view a copy of this license, visit http://creativecommons.org/licenses/by/4.0/

References:

[1]	C. Gauss, Theoria residuorum biquadraticorum, Commentario Prima (1828) [Werke, Vol. II, pp. 65--92].

[2]	A. F. Horadam, Complex Fibonacci numbers and Fibonacci quaternions, Amer. Math. Monthly 70 (1969) 289—291.

[3]	J. H. Jordan, Gaussian Fibonacci and Lucas numbers, Fibonacci Quart. 3 (1965) 315--318.

[4]	S. Pethe, A. F. Horadam, Generalized Gaussian Fibonacci numbers, Bull. Aust. Math. Soc. 33 (1986) 37--48.

[5]	G. Berzsenyi, Gaussian Fibonacci numbers, Fibonacci Quart. 15 (1977) 233--236.

[6]	Stakhov AP, Rozin B. "Theory of Binet formulas for Fibonacci and Lucas p-numbers". Chaos, Solitions & Fractals 2006; 27: 1162-77.

[7]	D. Tasci, Gaussian Balancing numbers and Gaussian Lucas-Balancing numbers, J. Sci. Arts 44 (2018) 661--666.

[8]	D. Tasci, Gaussian Padovan and Gaussian Pell-Padovan sequences, Commun. Fac. Sci. Univ. Ank. Ser. A1. Math. Stat. 67 (2018) 82--88.

[9]	D. Tasci, On Gaussian Mersenne numbers, J. Sci. Arts 57 (2021) 1021--1028.

[10]	D. Tasci, F. Yalcin, Complex Fibonacci p-numbers, Commun. Math. Appl. 4 (2013) 213--218.

[11]	Koshy T. "Fibonacci and Lucas Numbers with Applications," A Wiley-Interscience Publication, (2001)

[12]	P. Catarino, A. Borges, A note on Gaussian modified Pell numbers, J. Inf. Optim. Sci. 39 (2018) 1363—1371.

[13]	P. Catarino, A. Borges, A note on incomplete Leonardo numbers, Integers 20 (2020) #A43.

[14]	P. Catarino, A. Borges, On Leonardo numbers, Acta Math. Univ. Comenian. 89 (2020) 75--86.

[15]	D. Tasci On Gaussian Leonardo numbers. Contrib. Math. 2023, 7, 34--40.

[16]	Stakhov AP. "Introduction into algorithmic measurement theory". Soviet Radio, Moscow (1977) [in Russian].

[17]	M. Asci, E. Gurel "Gaussian Fibonacci and Gaussian Lucas p-Numbers" Ars Combin. 132, (2017), 389-402.

[18]	Tan, E.; Leung, H.H. On Leonardo p-numbers. Integers 2023, 23, 1--11.