用阿多米安分解法的可变分式还原微分变换求解非线性时域偏微分方程

R. S. Teppawar, R. N. Ingle, R. A. Muneshwar
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引用次数: 0

摘要

在本文中,我们使用了一种名为保形分数还原微分变换(CFRDT)与阿多米安分解的新技术,来估计带初值的一维和二维时间分数偏线性和非线性微分方程的解。我们解释了该技术的收敛性分析。所得结果表明,这种新方法在寻找时分数偏微分方程(PDEs)的近似解时既高效又简便。因此,所建议的方法对工程、物理和其他学科如何求解分数偏微分方程具有重要影响。此外,我们还利用 Mathematica 软件分析了二维或三维图形表示问题的解法。
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Solving Nonlinear Time-Fractional Partial Differential Equations Using Conformable Fractional Reduced Differential Transform with Adomian Decomposition Method
In this article, we use a new technique called conformable fractional reduced differential transform (CFRDT) with Adomian decomposition to estimate the solution of one and two-dimensional time-fractional partial linear and nonlinear differential equations with initial values. We explain the convergence analysis of this technique. The obtained results illustrate that the novel method is efficient and easy to use to find approximate solutions for the time-fractional partial differential equations (PDEs). Thus, the suggested method has a significant impact on how engineering, physics, and other disciplines solve fractional PDEs. Furthermore, we analyze the solution of problems with a 2D or 3D graphical representation by using Mathematica software.
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