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New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence

Cilt: 9 Sayı: 1 28 Şubat 2026
Şükran Uygun *
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New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence

Öz

Special integer sequences can be generalized by different many ways. The basic form of these ways is to add a parameter to recurrence relation. From special sequences, k-Jacobsthal, k-Jacobsthal-Lucas sequences are obtained adding a parameter to the recurrence relation of the Jacobsthal and Jacobsthal-Lucas numbers. In literature, there are some papers concerning the properties of k-Jacobsthal and k-Jacobsthal-Lucas sequences. But, we think they are not sufficient, so we aim to study new properties of these generalized sequences. The features related with k-Jacobsthal and k-Jacobsthal-Lucas sequences will be acquired through the Binet formulas, recurrence relations, generating functions of these numbers.

Anahtar Kelimeler

Binet formula, Generating function, k-Jacobsthal number, k-Jacobsthal–Lucas number

Kaynakça

  1. 1) Horadam, A. F. (1996). Jacobsthal Representation Numbers. The Fibonacci Quarterly, 34, 40–54.
  2. 2) Falcon, S. Plaza, A. ( 2007). On the Fibonacci k-Numbers. Chaos, Solitons&Fractals 32, 1615-1624.
  3. 3) Falcon, S. (2011). On the k-Lucas Numbers. International Cournal contemp. Math. Sciences, 6(21), 1039-1050.
  4. 4) Cerin, Z. (2007). Sums of Squares and Products of Jacobsthal Numbers. Journal of Integer Sequences, 10, Article 07.2.5.
  5. 5) Cerin, Z. (2007). Formulae for Sums of Jacobsthal Lucas Numbers. International Mathematical Forum, 2, 1969-1984.
  6. 6) Bolat, C. (2008). Properties and Applications of k-Fibonacci. k-Lucas Numbers. M.S thesis. Selcuk Univercity, Konya, Turkey.
  7. 7) Godase, A. D., Dhakne, M. B. (2014). On the properties of k-Fibonacci and k-Lucas numbers, International Journal of Advancesin Applied Mathematics and Mechanics, 2, 1, 2014, 100-106.
  8. 8) Catarino, P. (2014). On Some Identities for k-Fibonacci Sequence. International Journal contemp. Math. Sciences, 9(1), 37-42. 9) Jhala, D., K. Sisodiya and Rathore, G.P.S. (2013). On some identities for k-Jacobsthal numbers, Int. Journal of Math. Analysis, 7(12) 551-556.
  9. 10) Srisawat, S., Sriprad, W., Sthityanak, O. (2015). On the k-Jacobsthal Numbers by Matrix Methods. Progress in Applied Science and Technology, 5(1), 70–76.
  10. 11) Uygun S., Eldoğan H. (2016). k-Jacobsthal and k-Jacobsthal Lucas Matrix Sequences, International Mathematical Forum, 11(3), 145-154. 12) Uygun S., Owusu, E. (2016). A New Generalization of Jacobsthal Numbers (Bi-Periodic Jacobsthal Sequences). Journal of Mathematical Analysis, 5, 728-39. 13) N. J. A. Sloane, The On-Line Encyclopedia of Integer Sequences, 2006. 14) Zhang, Z. (1997). Some

Ayrıntılar

Birincil Dil

İngilizce

Konular

Temel Matematik (Diğer)

Bölüm

Araştırma Makalesi

Yazarlar

Yayımlanma Tarihi

28 Şubat 2026

Gönderilme Tarihi

2 Ocak 2026

Kabul Tarihi

9 Şubat 2026

Yayımlandığı Sayı

Yıl 2026 Cilt: 9 Sayı: 1

IZ

https://izlik.org/JA73HK74BE

Kaynak Göster

RIS / Bibtex
APA
Uygun, Ş. (2026). New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence. Journal of Advanced Mathematics and Mathematics Education, 9(1), 1-13. https://izlik.org/JA73HK74BE
AMA
1.Uygun Ş. New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence. Journal of Advanced Mathematics and Mathematics Education. 2026;9(1):1-13. https://izlik.org/JA73HK74BE
Chicago
Uygun, Şükran. 2026. “New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence”. Journal of Advanced Mathematics and Mathematics Education 9 (1): 1-13. https://izlik.org/JA73HK74BE.
EndNote
Uygun Ş (01 Şubat 2026) New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence. Journal of Advanced Mathematics and Mathematics Education 9 1 1–13.
IEEE
[1]Ş. Uygun, “New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence”, Journal of Advanced Mathematics and Mathematics Education, c. 9, sy 1, ss. 1–13, Şub. 2026, [çevrimiçi]. Erişim adresi: https://izlik.org/JA73HK74BE
ISNAD
Uygun, Şükran. “New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence”. Journal of Advanced Mathematics and Mathematics Education 9/1 (01 Şubat 2026): 1-13. https://izlik.org/JA73HK74BE.
JAMA
1.Uygun Ş. New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence. Journal of Advanced Mathematics and Mathematics Education. 2026;9:1–13.
MLA
Uygun, Şükran. “New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence”. Journal of Advanced Mathematics and Mathematics Education, c. 9, sy 1, Şubat 2026, ss. 1-13, https://izlik.org/JA73HK74BE.
Vancouver
1.Şükran Uygun. New Features for k-Jacobsthal And k-Jacobsthal-Lucas Sequence. Journal of Advanced Mathematics and Mathematics Education [Internet]. 01 Şubat 2026;9(1):1-13. Erişim adresi: https://izlik.org/JA73HK74BE