解决非线性分时费雪偏微分方程的新方法

Rana T. Shwayyea
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引用次数: 0

摘要

本研究的重点是利用解析级数解法求解非线性时间分数费舍尔偏微分方程。作者在公式中考虑了卡普托分数导数,从而提高了结果的准确性。他们引入了一种名为 LRPS 的新方法,该方法被证明是获得这些方程精确分析和数值解的有力工具。LRPS 方法强调精确性、有效性和实际应用,因此适用于物理学、工程学和金融学等多个领域。由于精确性、有效性和应用方法在该方法中的重要性,该方法强调,当数列各部分存在模式时,可以获得精确的解,反之则提供近似估计。LRPS 方法是专为解决非线性分数费舍尔偏微分方程而设计的强大技术。
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A Novel Approach for Solving Nonlinear Time Fractional Fisher Partial Differential Equations
This study focuses on solving non-linear time fractional Fisher partial differential equations using analytical series solutions. The authors consider the Caputo fractional derivative in their formulas, which adds accuracy to the results. They introduce a novel method called LRPS which proves to be a powerful tool for obtaining precise analytical and numerical solutions for these equations. The LRPS method emphasizes precision, effectiveness, and practical application, making it suitable for various fields such as physics, engineering, and finance. Due to the importance of accuracy, effectiveness and method of application in this approach, it is highlighted that accurate solutions can be obtained when there is a pattern in the parts of the series, while approximate estimates are provided otherwise. The LRPS method is presented as a powerful technique specifically designed for solving nonlinear fractional Fisher partial differential equations.
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