变分迭代法与切比雪夫小波结合求解对流扩散反应问题

IF 0.6 Q3 ENGINEERING, MULTIDISCIPLINARY
M. Memon, K. B. Amur, W. A. Shaikh
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引用次数: 0

摘要

本文的目的是利用切比雪夫小波组合的变分迭代方法求解非线性对流-扩散-反应问题。本文提出了一种基于Chebyshev小波的变分迭代法的混合迭代方法,用于求解非线性对流扩散反应问题。应用该算法的目的是为了实现快速收敛。在解决给定问题的过程中,限制变量将在数学上得到证明。重点研究了缩尺及扩散参数、对流参数、反应参数等参数对溶液的影响。近似结果包括误差分布和仿真。将Chebyshev小波变分迭代法与变分迭代法、改进变分迭代法和Legendre小波变分迭代法进行了比较。误差曲线允许我们将结果与已知的现有方案进行比较。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Combined variational iteration method with chebyshev wavelet for the solution of convection-diffusion-reaction problem
The goal of the work is to solve the nonlinear convection-diffusion-reaction problem using the variational iteration method with the combination of the Chebyshev wavelet. This work developed a hybrid iterative technique named as Variational iteration method with the Chebyshev wavelet for the solutions of nonlinear convection-diffusion-reaction problems. The aim of applying the derived algorithm is to achieve fast convergence. During the solution of the given problem, the restricted variations will be mathematically justified. The effects of the scaling and other parameters like diffusion parameter, convection parameter, and reaction parameter on the solution are also focused on by their suitable selection. The approximate results include the error profiles and the simulations. The results of variational iteration with the Chebyshev wavelet are compared with variational iteration method, the Modified variational iteration method, and the Variational iteration method with Legendre wavelet. The error profiles allow us to compare the results with well-known existing schemes.
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