Modified Fourier Transform for Solving Fractional Partial Differential Equations

被引：2

作者：

Hasanah, Dahliatul ^{[1
]}

Sisworo ^{[1
]}

Supeno, Imam ^{[1
]}

机构：

[1] FMIPA Univ Negeri Malang, Dept Math, Malang, Indonesia

来源：

3RD INTERNATIONAL CONFERENCE ON MATHEMATICS AND SCIENCE EDUCATION (ICOMSE) 2019: STRENGTHENING MATHEMATICS AND SCIENCE EDUCATION RESEARCH FOR THE CHALLENGE OF GLOBAL SOCIETY | 2020年 / 2215卷

关键词：

D O I：

10.1063/5.0004017

中图分类号：

G40 [教育学];

学科分类号：

040101 ; 120403 ;

摘要：

In recent years many physical phenomenons have been successfully modelled using fractional partial differential equations such as in electromagnetics and material sciences. Fractional partial differential equations involve derivative of noninteger order. Many researchers attempted to solve various types of fractional differential equations using various methods. In this paper, the conformable fractional derivative definition introduced by Khalil et.al [4] is used. The fractional derivative using this definition satisfies many properties that the usual derivative has. By applying some similar arguments on Fourier transform for solving partial differential equations, some modifications on the Fourier transform are constructed to handle the fractional order in a fractional differential equation. The modified Fourier transform which is developed satisfies similar properties with the Fourier transform in the classical sense. The application of the method to solve a fractional differential equation is given as an example.

引用

页数：7

共 13 条

[1] Abu Hammad M., 2014, International Journal of Pure and Applied Mathematics, V94, P215
[2] [Anonymous], 2002, FRACTIONAL CALCULUS
[3] Cenesiz Y., 2015, Journal of New Theory, V7, P79
[4] Fractional Order Calculus: Basic Concepts and Engineering Applications
Gutierrez, Ricardo Enrique
Rosario, Joao Mauricio
Machado, Jose Tenreiro
[J]. MATHEMATICAL PROBLEMS IN ENGINEERING, 2010, 2010
[5] IAbu Hammad, 2014, Am J Comput Appl Math, V4, P187
[6] A new definition of fractional derivative
Khalil, R.
Al Horani, M.
Yousef, A.
Sababheh, M.
[J]. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2014, 264 : 65 - 70
[7] Khalil R., 2015, International Journal of Pure and Applied Mathematics, V103, P667, DOI [10.12732/ijpam.v103i4.6, DOI 10.12732/ijpam.v103i4.6]
[8] Fractional Fourier transform in the framework of fractional calculus operators
Kilbas, A. A.
Luchko, Yu. F.
Martinez, H.
Trujillo, J. J.
[J]. INTEGRAL TRANSFORMS AND SPECIAL FUNCTIONS, 2010, 21 (10) : 779 - 795
[9] Exact Solutions with Variable Coefficient Function Forms for Conformable Fractional Partial Differential Equations by an Auxiliary Equation Method
Meng, Fanwei
Feng, Qinghua
[J]. ADVANCES IN MATHEMATICAL PHYSICS, 2018, 2018
[10] Conformable Laplace Transform of Fractional Differential Equations
Silva, Fernando S.
Moreira, Davidson M.
Moret, Marcelo A.
[J]. AXIOMS, 2018, 7 (03)

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