关于随机Newell Whitehead Segel方程的级数解

IF 1.8 3区 数学 Q1 MATHEMATICS
J. Hussain
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引用次数: 0

摘要

本文的目的是提出一种求解随机newwell - whitehead - segel (NWS)方程级数解的两步法。所提出的两步方法首先使用Wiener-Hermite展开(WHE)技术,该技术允许将随机问题按分量转换为一组耦合的确定性偏微分方程(PDEs)。WHE的确定性核通过分解随机过程作为随机NWS方程的解。第二步涉及使用简化微分变换(RDT)算法求解这些偏微分方程,该算法能够确定确定性核。最后一步是将这些核代入WHE,以导出随机NWS方程的级数解。计算了解的期望和方差,并以图形方式显示,以提供结果的清晰可视化表示。我们相信这种计算级数解过程的两步技术可以在很大程度上用于各种科学中出现的随机偏微分方程。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On the series solution of the stochastic Newell Whitehead Segel equation
The purpose of this paper is to present a two-step approach for finding the series solution of the stochastic Newell-Whitehead-Segel (NWS) equation. The proposed two-step approach starts with the use of the Wiener-Hermite expansion (WHE) technique, which allows the conversion of the stochastic problem into a set of coupled deterministic partial differential equations (PDEs) by components. The deterministic kernels of the WHE serve as the solution to the stochastic NWS equation by decomposing the stochastic process. The second step involves solving these PDEs using the reduced differential transform (RDT) algorithm, which enables the determination of the deterministic kernels. The final step involves plugging these kernels back into the WHE to derive the series solution of the stochastic NWS equation. The expectation and variance of the solution are calculated and graphically displayed to provide a clear visual representation of the results. We believe that this two-step technique for computing the series solution process can be used to a great extent for stochastic PDEs arising in a variety of sciences.
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来源期刊
AIMS Mathematics
AIMS Mathematics Mathematics-General Mathematics
CiteScore
3.40
自引率
13.60%
发文量
769
审稿时长
90 days
期刊介绍: AIMS Mathematics is an international Open Access journal devoted to publishing peer-reviewed, high quality, original papers in all fields of mathematics. We publish the following article types: original research articles, reviews, editorials, letters, and conference reports.
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