Innovative Method for Computing Approximate Solutions of Non-Homogeneous Wave Equations with Generalized Fractional Derivatives

IF 0.6 Q3 MATHEMATICS Contemporary Mathematics Pub Date : 2023-11-09 DOI:10.37256/cm.4420233593
Mir Sajjad Hashemi, Mohammad Mirzazadeh, Dumitru Baleanu
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Abstract

In this work, a well-known non-homogeneous wave equation with temporal fractional derivative is approximately investigated. A recently defined generalized non-local fractional derivative is utilized as the fractional operator. A novel technique is proposed to approximate the solutions of wave equation with generalized fractional derivative. The proposed method is based on the shifted Chebyshev polynomials and a combination of collocation and residual function methods. Theoretical analysis of the convergence of the proposed method is performed. Approximate solutions are derived in both rectangular and non-rectangular (general) domains.
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具有广义分数阶导数的非齐次波动方程近似解的创新计算方法
本文对一个著名的具有时间分数阶导数的非齐次波动方程进行了近似研究。利用最近定义的广义非局部分数阶导数作为分数算子。提出了一种用广义分数阶导数逼近波动方程解的新方法。该方法基于移位切比雪夫多项式,并结合了配点法和残差函数法。对该方法的收敛性进行了理论分析。在矩形和非矩形(一般)域上都推导出近似解。
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CiteScore
0.60
自引率
33.30%
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0
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