The relations between bi-periodic jacobsthal and bi-periodic jacobsthal lucas sequence
Abstract
Keywords
References
- [1] Horadam A. F., Jacobsthal Representation Numbers, The Fibonacci Quarterly, 37 (2) (1996) 40-54.
- [2] Edson M, Yayenie O., A New Generalization of Fibonacci Sequences and Extended Binet's Formula, Integers, 9 (2009) 639-654.
- [3] Yayenie O., A Note on Generalized Fibonacci Sequence, Applied Mathematics and Computation, 217 (2011) 5603-5611.
- [4] Jun S.P, Choi K.H., Some Properties of the Generalized Fibonacci Sequence {qn} by Matrix Methods, The Korean Journal of Mathematics, 24 (4) (2016) 681-691.
- [5] Bilgici G, Two Generalizations of Lucas Sequence, Applied Mathematics and Computation, 245 (2014) 526-538.
- [6] Uygun S., Owusu E., A New Generalization of Jacobsthal Numbers (Bi-Periodic Jacobsthal Sequences), Journal of Mathematical Analysis, 5 (2016) 728-39.
- [7] Uygun S., Karatas H., Akıncı E., Relations on Bi-periodic Jacobsthal Sequence, Transylvanian Journal of Mathematics and Mechanics, 10 (2) (2018) 141-151.
- [8] Uygun S., Owusu E., A Note on bi-periodic Jacobsthal Lucas Numbers, Journal of Advances in Mathematics and Computer Science, 34 (5) (2019) 1-13.
Details
Primary Language
English
Subjects
Mathematical Sciences
Journal Section
Research Article
Authors
Şükran Uygun
*
0000-0002-7878-2175
Türkiye
Publication Date
June 30, 2021
Submission Date
July 16, 2020
Acceptance Date
June 2, 2021
Published in Issue
Year 2021 Volume: 42 Number: 2
Cited By
On the Jacobsthal numbers which are the product of two Modified Pell numbers
Communications Faculty Of Science University of Ankara Series A1Mathematics and Statistics
https://doi.org/10.31801/cfsuasmas.1315051