Particular Solutions of the Confluent Hypergeometric Differential Equation by Using the Nabla Fractional Calculus Operator
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Date
2016
Journal Title
Journal ISSN
Volume Title
Publisher
Mdpi
Open Access Color
GOLD
Green Open Access
No
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No
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Top 10%
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Top 10%
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Average
Abstract
In this work; we present a method for solving the second-order linear ordinary differential equation of hypergeometric type. The solutions of this equation are given by the confluent hypergeometric functions (CHFs). Unlike previous studies, we obtain some different new solutions of the equation without using the CHFs. Therefore, we obtain new discrete fractional solutions of the homogeneous and non-homogeneous confluent hypergeometric differential equation (CHE) by using a discrete fractional Nabla calculus operator. Thus, we obtain four different new discrete complex fractional solutions for these equations.
Description
Tchier, Fairouz/0000-0001-7855-508X; Inc, Mustafa/0000-0003-4996-8373; Yilmazer, Resat/0000-0002-5059-3882
Keywords
Discrete Fractional Calculus, Confluent Hypergeometric Equation, Nabla Operator, QB460-466, Science, Physics, QC1-999, Q, discrete fractional calculus; confluent hypergeometric equation; Nabla operator, Nabla operator, confluent hypergeometric equation, Astrophysics, discrete fractional calculus
Fields of Science
0101 mathematics, 01 natural sciences
Citation
Yılmazer, R...et al. (2016). Particular solutions of the confluent hypergeometric differential equation by using the nabla fractional calculus operator. Entropy, 18(2). http://dx.doi.org/ 10.3390/e18020049
WoS Q
Q2
Scopus Q
Q2
OpenCitations Citation Count
14
Source
Entropy
Volume
18
Issue
2
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End Page
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CrossRef : 14
Scopus : 18
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