Abstract
References
- [1] OEIS Foundation Inc. (2011). The on-line encyclopedia of integer sequences. http://oeis.org.
- [2] Koshy T. (2001). Fibonacci and Lucas numbers with applications. John Wiley and Sons Inc, NY.
- [3] Chen, K.W. (2011). Greatest common divisors in shifted Fibonacci sequences. Journal of Integer Sequences, 14, 11.4.7.
- [4] Koken, F. (2020). The gcd sequences of the altered Lucas sequences. Annales Mathematicae Silesianae, 34, 2, 222-240. DOI: 10.2478/amsil-2020-0005.
- [5] Cerin, Z. (2013). On factors of sums of consecutive Fibonacci and Lucas numbers. Annales Mathematicae et Informaticae, 41, 19–25.
- [6] Tekcan, A., Gezer, B. and Bizim, O. (2007). Some relations on Lucas numbers and their sums. Advanced Studies in Contemporary Mathematics, 15, 195–211.
- [7] Szalay, L. (2012). Diophantine equations with binary recurrences associated to the Brocard–Ramanujan problem. Portugaliae Mathematica, 69, 3, 213–220.
- [8] Pongsriiam, P. (2017). Fibonacci and Lucas numbers associated with Brocard-Ramanujan equation. Communications of the Korean Mathematical Society, 32, 3, 511-522.
- [9] Kankal E. (2023). The thesis of master of science, Necmettin Erbakan University. The Graduate School of Natural And Applied Science, Konya.
Abstract
We investigate two types altered Lucas numbers denoted and defined by adding or subtracting a value from the square of the Lucas numbers. We achieve these numbers form as the consecutive products of the Fibonacci numbers. Therefore, consecutive sum-subtraction relations of altered Lucas numbers and their Binet-like formulas are given by using some properties of the Fibonacci numbers. Also, we explore the gcd sequences of r–successive terms of altered Lucas numbers denoted and , , according to the greatest common divisor (gcd) properties of consecutive terms of the Fibonacci numbers. We show that these sequences are periodic or Fibonacci sequences.
Keywords
Altered Lucas numbers Greatest common divisor (gcd) sequences Fibonacci sequence Lucas sequence
References
- [1] OEIS Foundation Inc. (2011). The on-line encyclopedia of integer sequences. http://oeis.org.
- [2] Koshy T. (2001). Fibonacci and Lucas numbers with applications. John Wiley and Sons Inc, NY.
- [3] Chen, K.W. (2011). Greatest common divisors in shifted Fibonacci sequences. Journal of Integer Sequences, 14, 11.4.7.
- [4] Koken, F. (2020). The gcd sequences of the altered Lucas sequences. Annales Mathematicae Silesianae, 34, 2, 222-240. DOI: 10.2478/amsil-2020-0005.
- [5] Cerin, Z. (2013). On factors of sums of consecutive Fibonacci and Lucas numbers. Annales Mathematicae et Informaticae, 41, 19–25.
- [6] Tekcan, A., Gezer, B. and Bizim, O. (2007). Some relations on Lucas numbers and their sums. Advanced Studies in Contemporary Mathematics, 15, 195–211.
- [7] Szalay, L. (2012). Diophantine equations with binary recurrences associated to the Brocard–Ramanujan problem. Portugaliae Mathematica, 69, 3, 213–220.
- [8] Pongsriiam, P. (2017). Fibonacci and Lucas numbers associated with Brocard-Ramanujan equation. Communications of the Korean Mathematical Society, 32, 3, 511-522.
- [9] Kankal E. (2023). The thesis of master of science, Necmettin Erbakan University. The Graduate School of Natural And Applied Science, Konya.
Details
| Primary Language | English |
|---|---|
| Journal Section | Research Articles |
| Authors | |
| Publication Date | September 30, 2023 |
| Submission Date | February 15, 2023 |
| Published in Issue | Year 2023 |