Shifted Fibonacci Numbers

Adnan Karataş

doi:10.35414/akufemubid.1345862

Research Article

Shifted Fibonacci Numbers

Year 2023, Volume: 23 Issue: 6, 1440 - 1444, 28.12.2023

Adnan Karataş

https://doi.org/10.35414/akufemubid.1345862

Abstract

Shifted Fibonacci numbers have been examined in the literature in terms of the greatest common divisor, but appropriate definitions and fundamental equations have not been worked on. In this article, we have obtained the Binet formula, which is a fundamental equation used to obtain the necessary element of the shifted Fibonacci number sequence. Additionally, we have obtained many well-known identities such as Cassini, Honsberger, and various other identities for this sequence. Furthermore, summation formulas for shifted Fibonacci numbers have been presented.

Keywords

Shifted Fibonacci Numbers, Binet Formula, Identities, Summation Formulas

References

Alp, Y., Kocer, E. G., 2021. Hybrid Leonardo numbers. Chaos, Solitons & Fractals, 150, 111128. Catarino, P. M., Borges, A., 2019. On Leonardo numbers. Acta Mathematica Universitatis Comenianae, 89, 75–86.
Chen, K.-W., 2011. Greatest common divisors in shifted Fibonacci sequences. Journal of Integer Sequences, 14, 11.4.7.
Dudley, U., Tucker, B., 1971. Greatest common divisors in altered Fibonacci sequences. Fibonacci Quarterly, 9, 89–91.
Falcon, S., Plaza, A., 2007. On the Fibonacci k-numbers. Chaos, Solitons & Fractals, 32, 1615–1624. Halici, S., Karatas¸, A., 2017. Some matrix representations of Fibonacci quaternions and octonions. Advances in Applied Clifford Algebras, 27, 1233–1242.
Hernandez, S., Luca, F., 2003. Common factors of shifted Fibonacci numbers. Periodica Mathematica Hungarica, 47, 95–110.
Horadam, A., 1961. A generalized Fibonacci sequence. The American Mathematical Monthly, 68, 455–459.
Horadam, A. F., 1963. Complex Fibonacci numbers and Fibonacci quaternions. The American Mathematical Monthly, 70, 289–291.
Karatas¸, A., 2022. On complex Leonardo numbers. Notes on Number Theory and Discrete Mathematics, 28, 458–465.
Nalli, A., Haukkanen, P., 2009. On generalized Fibonacci and Lucas polynomials. Chaos, Solitons & Fractals, 42, 3179–3186.
Özkan, E., Aydoğdu, A., Altun, İ., 2017. Some identities for a family of Fibonacci and Lucas numbers. Journal of Mathematics and Statistical Science, 3, 295–303.
Sanna, C., 2020. On the lcm of shifted Fibonacci numbers. arXiv preprint arXiv:(2007.13330). https://doi.org/10.48550/arXiv.2007.13330
Sloane, N. J. A., 1973. A Handbook of Integer Sequences. Academic press, 40.
Sloane, N. J. A., Plouffe, S. 1995. The encyclopedia of integer sequences. Academic press, 129.
Spilker, J., Thang, L. B., Giay, C., 2022. The greatest common divisor of shifted Fibonacci numbers. Journal of Integer Sequences, 25, 22.1.7.

Kaymış Fibonacci Sayıları

Year 2023, Volume: 23 Issue: 6, 1440 - 1444, 28.12.2023

Adnan Karataş

https://doi.org/10.35414/akufemubid.1345862

Abstract

Kaymış Fibonacci sayıları, literatürde, en büyük ortak bölen açısından incelenmiştir, ancak uygun tanım ve temel denklemler çalışılmamıştır. Bu makalede, kaymış Fibonacci sayı dizisinin gerekli elemanını elde etmek için kullanılan ve temel bir formül olan Binet formülünü verdik. Ayrıca, Cassini, Honsberger ve diğer birçok bilinen özdeşlikleri ve bu dizi için çok sayıda farklı özdeşlikler elde edilmiştir. Ayrıca, kaymış Fibonacci sayıları için toplama formülleri sunulmuştur.

Keywords

Kaymış Fibonacci Sayıları, Binet Formülü, Özdeşlikler, Toplam Formülleri

References

Alp, Y., Kocer, E. G., 2021. Hybrid Leonardo numbers. Chaos, Solitons & Fractals, 150, 111128. Catarino, P. M., Borges, A., 2019. On Leonardo numbers. Acta Mathematica Universitatis Comenianae, 89, 75–86.
Chen, K.-W., 2011. Greatest common divisors in shifted Fibonacci sequences. Journal of Integer Sequences, 14, 11.4.7.
Dudley, U., Tucker, B., 1971. Greatest common divisors in altered Fibonacci sequences. Fibonacci Quarterly, 9, 89–91.
Falcon, S., Plaza, A., 2007. On the Fibonacci k-numbers. Chaos, Solitons & Fractals, 32, 1615–1624. Halici, S., Karatas¸, A., 2017. Some matrix representations of Fibonacci quaternions and octonions. Advances in Applied Clifford Algebras, 27, 1233–1242.
Hernandez, S., Luca, F., 2003. Common factors of shifted Fibonacci numbers. Periodica Mathematica Hungarica, 47, 95–110.
Horadam, A., 1961. A generalized Fibonacci sequence. The American Mathematical Monthly, 68, 455–459.
Horadam, A. F., 1963. Complex Fibonacci numbers and Fibonacci quaternions. The American Mathematical Monthly, 70, 289–291.
Karatas¸, A., 2022. On complex Leonardo numbers. Notes on Number Theory and Discrete Mathematics, 28, 458–465.
Nalli, A., Haukkanen, P., 2009. On generalized Fibonacci and Lucas polynomials. Chaos, Solitons & Fractals, 42, 3179–3186.
Özkan, E., Aydoğdu, A., Altun, İ., 2017. Some identities for a family of Fibonacci and Lucas numbers. Journal of Mathematics and Statistical Science, 3, 295–303.
Sanna, C., 2020. On the lcm of shifted Fibonacci numbers. arXiv preprint arXiv:(2007.13330). https://doi.org/10.48550/arXiv.2007.13330
Sloane, N. J. A., 1973. A Handbook of Integer Sequences. Academic press, 40.
Sloane, N. J. A., Plouffe, S. 1995. The encyclopedia of integer sequences. Academic press, 129.
Spilker, J., Thang, L. B., Giay, C., 2022. The greatest common divisor of shifted Fibonacci numbers. Journal of Integer Sequences, 25, 22.1.7.

There are 14 citations in total.

Details

Primary Language	English
Subjects	Algebra and Number Theory
Journal Section	Articles
Authors	Adnan Karataş 0000-0003-3652-5354
Early Pub Date	December 22, 2023
Publication Date	December 28, 2023
Submission Date	August 21, 2023
Published in Issue	Year 2023 Volume: 23 Issue: 6

Cite

APA	Karataş, A. (2023). Shifted Fibonacci Numbers. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, 23(6), 1440-1444. https://doi.org/10.35414/akufemubid.1345862
AMA	Karataş A. Shifted Fibonacci Numbers. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. December 2023;23(6):1440-1444. doi:10.35414/akufemubid.1345862
Chicago	Karataş, Adnan. “Shifted Fibonacci Numbers”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 23, no. 6 (December 2023): 1440-44. https://doi.org/10.35414/akufemubid.1345862.
EndNote	Karataş A (December 1, 2023) Shifted Fibonacci Numbers. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 23 6 1440–1444.
IEEE	A. Karataş, “Shifted Fibonacci Numbers”, Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, vol. 23, no. 6, pp. 1440–1444, 2023, doi: 10.35414/akufemubid.1345862.
ISNAD	Karataş, Adnan. “Shifted Fibonacci Numbers”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 23/6 (December 2023), 1440-1444. https://doi.org/10.35414/akufemubid.1345862.
JAMA	Karataş A. Shifted Fibonacci Numbers. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. 2023;23:1440–1444.
MLA	Karataş, Adnan. “Shifted Fibonacci Numbers”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, vol. 23, no. 6, 2023, pp. 1440-4, doi:10.35414/akufemubid.1345862.
Vancouver	Karataş A. Shifted Fibonacci Numbers. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. 2023;23(6):1440-4.

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