A Different Solution Method for the Confluent Hypergeometric Equation
Yıl: 2017 Cilt: 7 Sayı: 2 Sayfa Aralığı: 215 - 224 Metin Dili: Türkçe İndeks Tarihi: 29-07-2022
A Different Solution Method for the Confluent Hypergeometric Equation
Öz: Kesirli hesap teorisi, keyfi mertebeden türev ve integral tanımını kapsamaktadır. Diferansiyel denklemlerin ve kesirli diferansiyel denklemlerin bazı s1n1flar1n1 çözmek için bu teori kullanılmaktadır. Bu denklemlerden birisi konfluent hipergeometrik denklemidir. Bu makalede, farklı bir çözüm metodu olarak 1V metodunun uygulanmasıyla bu denklemi çözmeyi hedeüemekteyiz.
Anahtar Kelime: Konular:
Konfluent Hipergeometrik Denklemi İçin Farklı Bir Çözüm Metodu
Öz: ABSTRACT: Fractional calculus theory includes definition of the derivatives and integrals of arbitrary order. This theory is used to solve some classes of singular differential equations and fractional order differential equations. One of these equations is the confluent hypergeometric equation. In this paper, we intend to solve this equation by applying method as different solution method.
Anahtar Kelime: Konular:
Belge Türü: Makale Makale Türü: Araştırma Makalesi Erişim Türü: Erişime Açık
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| APA | ÖZTÜRK Ö (2017). A Different Solution Method for the Confluent Hypergeometric Equation. , 215 - 224. |
| Chicago | ÖZTÜRK Ökkeş A Different Solution Method for the Confluent Hypergeometric Equation. (2017): 215 - 224. |
| MLA | ÖZTÜRK Ökkeş A Different Solution Method for the Confluent Hypergeometric Equation. , 2017, ss.215 - 224. |
| AMA | ÖZTÜRK Ö A Different Solution Method for the Confluent Hypergeometric Equation. . 2017; 215 - 224. |
| Vancouver | ÖZTÜRK Ö A Different Solution Method for the Confluent Hypergeometric Equation. . 2017; 215 - 224. |
| IEEE | ÖZTÜRK Ö "A Different Solution Method for the Confluent Hypergeometric Equation." , ss.215 - 224, 2017. |
| ISNAD | ÖZTÜRK, Ökkeş. "A Different Solution Method for the Confluent Hypergeometric Equation". (2017), 215-224. |
| APA | ÖZTÜRK Ö (2017). A Different Solution Method for the Confluent Hypergeometric Equation. Iğdır Üniversitesi Fen Bilimleri Enstitüsü Dergisi, 7(2), 215 - 224. |
| Chicago | ÖZTÜRK Ökkeş A Different Solution Method for the Confluent Hypergeometric Equation. Iğdır Üniversitesi Fen Bilimleri Enstitüsü Dergisi 7, no.2 (2017): 215 - 224. |
| MLA | ÖZTÜRK Ökkeş A Different Solution Method for the Confluent Hypergeometric Equation. Iğdır Üniversitesi Fen Bilimleri Enstitüsü Dergisi, vol.7, no.2, 2017, ss.215 - 224. |
| AMA | ÖZTÜRK Ö A Different Solution Method for the Confluent Hypergeometric Equation. Iğdır Üniversitesi Fen Bilimleri Enstitüsü Dergisi. 2017; 7(2): 215 - 224. |
| Vancouver | ÖZTÜRK Ö A Different Solution Method for the Confluent Hypergeometric Equation. Iğdır Üniversitesi Fen Bilimleri Enstitüsü Dergisi. 2017; 7(2): 215 - 224. |
| IEEE | ÖZTÜRK Ö "A Different Solution Method for the Confluent Hypergeometric Equation." Iğdır Üniversitesi Fen Bilimleri Enstitüsü Dergisi, 7, ss.215 - 224, 2017. |
| ISNAD | ÖZTÜRK, Ökkeş. "A Different Solution Method for the Confluent Hypergeometric Equation". Iğdır Üniversitesi Fen Bilimleri Enstitüsü Dergisi 7/2 (2017), 215-224. |
