时间分数阶电报方程的Riesz空间分数阶导数解析逼近

S. Mohammadian, Y. Mahmoudi, F. D. Saei
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引用次数: 1

摘要

本文提出了分数阶约微分变换方法(FRDTM),用于推导包含Riesz空间分数阶导数的分数阶偏微分方程的半解析解。本文主要研究了在Riesz空间-分数阶电报方程中实现FRDTM的新算法。给出了计算Riesz微分算子微分变换的定理及其证明,并给出了该方法的收敛条件和误差界。为了说明该方法的可靠性和能力,给出了一些算例。结果表明,该算法是一种简单有效的算法。数学学科分类(2010):65Z05, 35Q60, 35Q99。
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Analytical approximation of time-fractional telegraph equation with Riesz space-fractional derivative
In this study, fractional reduced differential transform method (FRDTM) is developed to derive a semianalytical solution of fractional partial differential equations which involves Riesz space fractional derivatives. We focus primarily on implementing the novel algorithm of FRDTM to Riesz space -fractional telegraph equation while the telegraph equation has fractional order. Some theorems with their proofs which are used for calculating differential transform of Riesz derivative operator are presented, as well as the convergence condition and the error bound of the proposed method are established. To illustrate the reliability and capability of the method, some examples are provided. The results reveal that the algorithm is very effective and uncomplicated. Mathematics subject classification (2010): 65Z05, 35Q60, 35Q99.
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