EN
Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product
Abstract
The Fibonacci number sequence and related calculations come up in scientific facts in many events we encounter in
daily life. This special number sequence is processed in the occurrence of many events such as calculating the diameter of the equatorial circumference of the Earth, flowers, growth and structures of leaves, trees, reproduction of bees, sunflower and so on. [6]. However, in recent years, the relation between the Fibonacci and Lucas Number sequences with continued fractions and matrices has intensively been studied. Many identities have been found by some 2X2 types of special matrices with nth power that have been associated with the Fibonacci and Lucas numbers. The aim of this study is to examine matrix (1 1 -1 0) under the lorentzian matrix product with nth power, quadratic equations and characteristic roots unlike the classical matrix product. In addition, we want to acquire some identities with the help of matrix (1 1 -1 0) under the lorentzian matrix product with nth power
in relation to the Fibonacci and Lucas numbers.
Keywords
Kaynakça
- 1 B.U. Alfred, An Introduction to Fibonacci Discovery, The Fibonacci Association, (1965).
- 2 C.K. Ho, H.S. Woon and C-Y. Chong, Generating Matrix and Sums of Fibonacci and Pell Sequences , AIP Conference Proceedings, 1605,( 2014) 678.
- 3 H. Gundogan and O. Kecilioglu, Lorentzian Matrix Multiplication and the Motions on Lorentzian Plane, Glasnik Matematicki, Vol. (41)61, (2006), 329-334.
- 4 M.Bicknell and V. E. Hoggatt, A Primer for the Fibonacci Numbers: Part XIV, The Fibonacci Quarterly, 12:2 (April), (1974),147-156.
- 5 S. Falcon, Relationships Between Some k-Fibonacci Sequences, Appl. Math., 5,( 2014), 2226-2234.
- 6 T. Koshy, Fibonacci and Lucas Numbers with Applications, John Wiley and Sons, New York, Toronto, (2001).
- 7 V.E. Hoggatt,Fibonacci and Lucas Numbers, The Fibonacci Association, Santa Clara (1969).
Ayrıntılar
Birincil Dil
İngilizce
Konular
Mühendislik
Bölüm
Konferans Bildirisi
Yayımlanma Tarihi
15 Aralık 2020
Gönderilme Tarihi
24 Temmuz 2020
Kabul Tarihi
30 Eylül 2020
Yayımlandığı Sayı
Yıl 1970 Cilt: 3 Sayı: 1
APA
Gökcan, İ., & Değer, A. H. (2020). Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product. Conference Proceedings of Science and Technology, 3(1), 102-109. https://izlik.org/JA35XF74UN
AMA
1.Gökcan İ, Değer AH. Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product. Conference Proceedings of Science and Technology. 2020;3(1):102-109. https://izlik.org/JA35XF74UN
Chicago
Gökcan, İbrahim, ve Ali Hikmet Değer. 2020. “Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product”. Conference Proceedings of Science and Technology 3 (1): 102-9. https://izlik.org/JA35XF74UN.
EndNote
Gökcan İ, Değer AH (01 Aralık 2020) Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product. Conference Proceedings of Science and Technology 3 1 102–109.
IEEE
[1]İ. Gökcan ve A. H. Değer, “Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product”, Conference Proceedings of Science and Technology, c. 3, sy 1, ss. 102–109, Ara. 2020, [çevrimiçi]. Erişim adresi: https://izlik.org/JA35XF74UN
ISNAD
Gökcan, İbrahim - Değer, Ali Hikmet. “Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product”. Conference Proceedings of Science and Technology 3/1 (01 Aralık 2020): 102-109. https://izlik.org/JA35XF74UN.
JAMA
1.Gökcan İ, Değer AH. Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product. Conference Proceedings of Science and Technology. 2020;3:102–109.
MLA
Gökcan, İbrahim, ve Ali Hikmet Değer. “Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product”. Conference Proceedings of Science and Technology, c. 3, sy 1, Aralık 2020, ss. 102-9, https://izlik.org/JA35XF74UN.
Vancouver
1.İbrahim Gökcan, Ali Hikmet Değer. Obtaining Some Identities With the nth Power of a Matrix Under the Lorentzian Product. Conference Proceedings of Science and Technology [Internet]. 01 Aralık 2020;3(1):102-9. Erişim adresi: https://izlik.org/JA35XF74UN