Modified Wavelet Method for Solving Two-dimensional Coupled System of Evolution Equations

I. Singh, S. Kumar
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引用次数: 0

Abstract

. As two-dimensional coupled system of nonlinear partial dif-ferential equations does not give enough smooth solutions, when approximated by linear, quadratic and cubic polynomials and gives poor convergence or no convergence. In such cases, approximation by zero degree polynomials like Haar wavelets (continuous functions with finite jumps) are most suitable and reliable. Therefore, modified numerical method based on Taylor series expansion and Haar wavelets is presented for solving coupled system of nonlinear partial differential equations. Efficiency and accuracy of the proposed method is depicted by comparing with classical methods.
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求解二维演化方程耦合系统的改进小波法
. 由于非线性偏微分方程的二维耦合系统在用线性多项式、二次多项式和三次多项式逼近时不能给出足够的光滑解,收敛性差或不收敛。在这种情况下,像哈尔小波(具有有限跳跃的连续函数)这样的零度多项式的逼近是最合适和可靠的。为此,提出了基于泰勒级数展开和Haar小波的非线性偏微分方程耦合系统的修正数值求解方法。通过与经典方法的比较,说明了该方法的有效性和准确性。
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CiteScore
0.90
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0.00%
发文量
20
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