TR
Discovering The Relationships between Fractional Order Derivatives and Complex Numbers
Öz
The derivative concept was defined by Newton and Leipzig. After these scientists, there are many approaches about the order of derivative, since derivative defined by Newton and Leipzig considered as order of 1. So, imaginary axis vanishes and the result of derivation is a real number / function. However, in case of other orders of derivations, the obtained results have real and imaginary axises, since complex numbers and derivative have directions and magnitudes. This paper includes these relationships by using fractional order derivative (_α^∂)Kf(t) defined by Karcı.
Anahtar Kelimeler
Kaynakça
- Das, S., “Functional Fractional Calculus”, Springer-Verlag Berlin Heidelberg, 2011.
- Karcı, A.,”Kesirli Türev için Yapılan Tanımlamaların Eksiklikleri ve Yeni Yaklaşım”, TOK-2013 Turkish Automatic Control National Meeting and Exhibition, 2013a.
- Karcı,A., “A New Approach for Fractional Order Derivative and Its Applications”, Universal Journal of Engineering Sciences, Vol:1, pp: 110-117, 2013b.
- Karcı, A., “Properties of Fractional Order Derivatives for Groups of Relations/Functions”, Universal Journal of Engineering Sciences, vol:3, pp:39-45, 2015a.
- Karcı, A.,”The Linear, Nonlinear and Partial Differential Equations are not Fractional Order Differential Equations”, Universal Journal of Engineering Sciences, vol:3, pp:46-51, 2015b.
- Karcı, A.,“Generalized Fractional Order Derivatives for Products and Quotients”, Science Innovation, vol:3, pp:58-62, 2015c.
- Karcı, A.,“Chain Rule for Fractional Order Derivatives”, Science Innovation, vol:3, 63-67, 2015d.
- Karcı, A.“The Properties of New Approach of Fractional Order Derivative”, Journal of the Faculty of Engineering and Architecture of Gazi University, Vol.30, pp:487-501, 2015e.
Ayrıntılar
Birincil Dil
İngilizce
Konular
Bilgisayar Yazılımı
Bölüm
Araştırma Makalesi
Yayımlanma Tarihi
1 Haziran 2020
Gönderilme Tarihi
26 Aralık 2019
Kabul Tarihi
12 Mart 2020
Yayımlandığı Sayı
Yıl 2020 Cilt: 5 Sayı: 1
APA
Karci, A., & Karcı, Ş. (2020). Discovering The Relationships between Fractional Order Derivatives and Complex Numbers. Computer Science, 5(1), 42-53. https://izlik.org/JA46XW48UK
AMA
1.Karci A, Karcı Ş. Discovering The Relationships between Fractional Order Derivatives and Complex Numbers. JCS. 2020;5(1):42-53. https://izlik.org/JA46XW48UK
Chicago
Karci, Ali, ve Şeyda Karcı. 2020. “Discovering The Relationships between Fractional Order Derivatives and Complex Numbers”. Computer Science 5 (1): 42-53. https://izlik.org/JA46XW48UK.
EndNote
Karci A, Karcı Ş (01 Haziran 2020) Discovering The Relationships between Fractional Order Derivatives and Complex Numbers. Computer Science 5 1 42–53.
IEEE
[1]A. Karci ve Ş. Karcı, “Discovering The Relationships between Fractional Order Derivatives and Complex Numbers”, JCS, c. 5, sy 1, ss. 42–53, Haz. 2020, [çevrimiçi]. Erişim adresi: https://izlik.org/JA46XW48UK
ISNAD
Karci, Ali - Karcı, Şeyda. “Discovering The Relationships between Fractional Order Derivatives and Complex Numbers”. Computer Science 5/1 (01 Haziran 2020): 42-53. https://izlik.org/JA46XW48UK.
JAMA
1.Karci A, Karcı Ş. Discovering The Relationships between Fractional Order Derivatives and Complex Numbers. JCS. 2020;5:42–53.
MLA
Karci, Ali, ve Şeyda Karcı. “Discovering The Relationships between Fractional Order Derivatives and Complex Numbers”. Computer Science, c. 5, sy 1, Haziran 2020, ss. 42-53, https://izlik.org/JA46XW48UK.
Vancouver
1.Ali Karci, Şeyda Karcı. Discovering The Relationships between Fractional Order Derivatives and Complex Numbers. JCS [Internet]. 01 Haziran 2020;5(1):42-53. Erişim adresi: https://izlik.org/JA46XW48UK
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