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Natural Transform for Solving Fractional Models 被引量:1
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作者 Ahmed Safwat Abdel-Rady Saad Zagloul Rida +1 位作者 Anas Ahmed Mohamed Arafa Hamdy Ragab Abedl-Rahim 《Journal of Applied Mathematics and Physics》 2015年第12期1633-1644,共12页
In this paper, we present a novel technique to obtain approximate analytical solution of fractional physical models. The new technique is a combination of a domain decomposition method and natural transform method cal... In this paper, we present a novel technique to obtain approximate analytical solution of fractional physical models. The new technique is a combination of a domain decomposition method and natural transform method called a domain decomposition natural transform method (ADNTM). The fractional derivatives are considered in Caputo sense. To illustrate the power and reliability of the method some applications are provided. 展开更多
关键词 Fractional Calculus natural Transform A Domain decomposition natural Transform method(ADNTM) Fokker-Planck Equation Schrodinger Equation Kelin-Gorden Equation
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Regarding Deeper Properties of the Fractional Order Kundu-Eckhaus Equation and Massive Thirring Model
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作者 Yaya Wang P.Veeresha +2 位作者 D.G.Prakasha Haci Mehmet Baskonus Wei Gao 《Computer Modeling in Engineering & Sciences》 SCIE EI 2022年第12期697-717,共21页
In this paper,the fractional natural decomposition method(FNDM)is employed to find the solution for the Kundu-Eckhaus equation and coupled fractional differential equations describing the massive Thirring model.Themas... In this paper,the fractional natural decomposition method(FNDM)is employed to find the solution for the Kundu-Eckhaus equation and coupled fractional differential equations describing the massive Thirring model.Themassive Thirring model consists of a system of two nonlinear complex differential equations,and it plays a dynamic role in quantum field theory.The fractional derivative is considered in the Caputo sense,and the projected algorithm is a graceful mixture of Adomian decomposition scheme with natural transform technique.In order to illustrate and validate the efficiency of the future technique,we analyzed projected phenomena in terms of fractional order.Moreover,the behaviour of the obtained solution has been captured for diverse fractional order.The obtained results elucidate that the projected technique is easy to implement and very effective to analyze the behaviour of complex nonlinear differential equations of fractional order arising in the connected areas of science and engineering. 展开更多
关键词 Fractional Kundu-Eckhaus equation fractional natural decomposition method fractional massive Thirring model numerical method Caputo fractional derivative
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The Investigation of the Fractional-View Dynamics of Helmholtz Equations Within Caputo Operator
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作者 Rashid Jan Hassan Khan +3 位作者 Poom Kumam Fairouz Tchier Rasool Shah Haifa Bin Jebreen 《Computers, Materials & Continua》 SCIE EI 2021年第9期3185-3201,共17页
It is eminent that partial differential equations are extensively meaningful in physics,mathematics and engineering.Natural phenomena are formulated with partial differential equations and are solved analytically or n... It is eminent that partial differential equations are extensively meaningful in physics,mathematics and engineering.Natural phenomena are formulated with partial differential equations and are solved analytically or numerically to interrogate the system’s dynamical behavior.In the present research,mathematical modeling is extended and the modeling solutions Helmholtz equations are discussed in the fractional view of derivatives.First,the Helmholtz equations are presented in Caputo’s fractional derivative.Then Natural transformation,along with the decomposition method,is used to attain the series form solutions of the suggested problems.For justification of the proposed technique,it is applied to several numerical examples.The graphical representation of the solutions shows that the suggested technique is an accurate and effective technique with a high convergence rate than other methods.The less calculation and higher rate of convergence have confirmed the present technique’s reliability and applicability to solve partial differential equations and their systems in a fractional framework. 展开更多
关键词 Fractional-order Helmholtz equations fractional calculus natural transform decomposition method analytic solution
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