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Pell Leonardo numbers and their matrix representations

Yıl 2024, , 101 - 108, 31.08.2024
https://doi.org/10.54187/jnrs.1506171

Öz

In this study, we investigate Pell numbers and Leonardo numbers and describe a new third-order number sequence entitled Pell Leonardo numbers. We then construct some identities, including the Binet formula, generating function, exponential generating function, Catalan, Cassini, and d’Ocagne’s identities for Pell Leonardo numbers and obtain a relation between Pell Leonardo and Pell numbers. In addition, we present some summation formulas of Pell Leonardo numbers based on Pell numbers. Finally, we create a matrix formula for Pell Leonardo numbers and obtain the determinant of the matrix.

Etik Beyan

No approval from the Board of Ethics is required.

Kaynakça

  • M. Bicknell, A primer of the Pell sequence and related sequences, The Fibonacci Quarterly 13 (4) (1975) 345–349.
  • A. F. Horadam, Applications of modified Pell numbers to representations, Ulam Quarterly 3 (1) (1994) 34-53.
  • R. Melham, Sums involving Fibonacci and Pell numbers, Portugaliae Mathematica 56 (3) (1999) 309-318.
  • S. F. Santana, J. L. Díaz-Barrero, Some properties of sums involving Pell numbers, Missouri Journal of Mathematical Sciences 18 (1) (2006) 33-40.
  • Q. Mushtaq, U. Hayat, Pell numbers, Pell–Lucas numbers and modular group, In Algebra Colloquium 14 (1) (2007) 97-102.
  • A. Dasdemir, On the Pell, Pell-Lucas and modified Pell numbers by matrix method, Applied Mathematical Sciences 5 (64) (2011) 3173-3181.
  • S. Çelik, İ. Durukan, E. Özkan, New recurrences on Pell numbers, Pell-Lucas numbers, Jacobsthal numbers and Jacobsthal-Lucas numbers, Chaos, Solitons & Fractals 150 (2021), Article Number 111173 8 pages.
  • P. M. Catarino and A. Borges, On Leonardo numbers, Acta Mathematica Universitatis Comenianae 89 (1) (2019) 75-86.
  • A. G. Shannon, A note on generalized Leonardo numbers, Notes on Number Theory and Discrete Mathematics 25 (3) (2019) 97-101.
  • Y. Alp, E. G. Koçer, Some properties of Leonardo numbers, Konuralp Journal of Mathematics 9 (1) (2021) 183-189.
  • Y. Alp, E. G. Kocer, Hybrid Leonardo numbers, Chaos, Solitons & Fractals 150 (2021) Article Number 111128 5 pages.
  • K. Kuhapatanakul, J. Chobsorn, On the generalized Leonardo Numbers, Integers: Electronic Journal of Combinatorial Number Theory 22 (2022) Article Number A48 7 pages.
  • A. Karatas, On complex Leonardo numbers, Notes on Number Theory and Discrete Mathematics 28 (3) (2022) 458-465.
  • E. Tan, H. H. Leung, On Leonardo p-numbers, Integers: Electronic Journal of Combinatorial Number Theory 23 (2023) 1-11.
  • Y. Soykan, Generalized Horadam-Leonardo numbers and polynomials, Asian Journal of Advanced Research and Reports 17 (8) (2023) 128-169.
Yıl 2024, , 101 - 108, 31.08.2024
https://doi.org/10.54187/jnrs.1506171

Öz

Kaynakça

  • M. Bicknell, A primer of the Pell sequence and related sequences, The Fibonacci Quarterly 13 (4) (1975) 345–349.
  • A. F. Horadam, Applications of modified Pell numbers to representations, Ulam Quarterly 3 (1) (1994) 34-53.
  • R. Melham, Sums involving Fibonacci and Pell numbers, Portugaliae Mathematica 56 (3) (1999) 309-318.
  • S. F. Santana, J. L. Díaz-Barrero, Some properties of sums involving Pell numbers, Missouri Journal of Mathematical Sciences 18 (1) (2006) 33-40.
  • Q. Mushtaq, U. Hayat, Pell numbers, Pell–Lucas numbers and modular group, In Algebra Colloquium 14 (1) (2007) 97-102.
  • A. Dasdemir, On the Pell, Pell-Lucas and modified Pell numbers by matrix method, Applied Mathematical Sciences 5 (64) (2011) 3173-3181.
  • S. Çelik, İ. Durukan, E. Özkan, New recurrences on Pell numbers, Pell-Lucas numbers, Jacobsthal numbers and Jacobsthal-Lucas numbers, Chaos, Solitons & Fractals 150 (2021), Article Number 111173 8 pages.
  • P. M. Catarino and A. Borges, On Leonardo numbers, Acta Mathematica Universitatis Comenianae 89 (1) (2019) 75-86.
  • A. G. Shannon, A note on generalized Leonardo numbers, Notes on Number Theory and Discrete Mathematics 25 (3) (2019) 97-101.
  • Y. Alp, E. G. Koçer, Some properties of Leonardo numbers, Konuralp Journal of Mathematics 9 (1) (2021) 183-189.
  • Y. Alp, E. G. Kocer, Hybrid Leonardo numbers, Chaos, Solitons & Fractals 150 (2021) Article Number 111128 5 pages.
  • K. Kuhapatanakul, J. Chobsorn, On the generalized Leonardo Numbers, Integers: Electronic Journal of Combinatorial Number Theory 22 (2022) Article Number A48 7 pages.
  • A. Karatas, On complex Leonardo numbers, Notes on Number Theory and Discrete Mathematics 28 (3) (2022) 458-465.
  • E. Tan, H. H. Leung, On Leonardo p-numbers, Integers: Electronic Journal of Combinatorial Number Theory 23 (2023) 1-11.
  • Y. Soykan, Generalized Horadam-Leonardo numbers and polynomials, Asian Journal of Advanced Research and Reports 17 (8) (2023) 128-169.
Toplam 15 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Cebir ve Sayı Teorisi
Bölüm Articles
Yazarlar

Çağla Çelemoğlu 0000-0003-0572-8132

Erken Görünüm Tarihi 30 Ağustos 2024
Yayımlanma Tarihi 31 Ağustos 2024
Gönderilme Tarihi 27 Haziran 2024
Kabul Tarihi 19 Ağustos 2024
Yayımlandığı Sayı Yıl 2024

Kaynak Göster

APA Çelemoğlu, Ç. (2024). Pell Leonardo numbers and their matrix representations. Journal of New Results in Science, 13(2), 101-108. https://doi.org/10.54187/jnrs.1506171
AMA Çelemoğlu Ç. Pell Leonardo numbers and their matrix representations. JNRS. Ağustos 2024;13(2):101-108. doi:10.54187/jnrs.1506171
Chicago Çelemoğlu, Çağla. “Pell Leonardo Numbers and Their Matrix Representations”. Journal of New Results in Science 13, sy. 2 (Ağustos 2024): 101-8. https://doi.org/10.54187/jnrs.1506171.
EndNote Çelemoğlu Ç (01 Ağustos 2024) Pell Leonardo numbers and their matrix representations. Journal of New Results in Science 13 2 101–108.
IEEE Ç. Çelemoğlu, “Pell Leonardo numbers and their matrix representations”, JNRS, c. 13, sy. 2, ss. 101–108, 2024, doi: 10.54187/jnrs.1506171.
ISNAD Çelemoğlu, Çağla. “Pell Leonardo Numbers and Their Matrix Representations”. Journal of New Results in Science 13/2 (Ağustos 2024), 101-108. https://doi.org/10.54187/jnrs.1506171.
JAMA Çelemoğlu Ç. Pell Leonardo numbers and their matrix representations. JNRS. 2024;13:101–108.
MLA Çelemoğlu, Çağla. “Pell Leonardo Numbers and Their Matrix Representations”. Journal of New Results in Science, c. 13, sy. 2, 2024, ss. 101-8, doi:10.54187/jnrs.1506171.
Vancouver Çelemoğlu Ç. Pell Leonardo numbers and their matrix representations. JNRS. 2024;13(2):101-8.


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