控制系统中出现的奇异扰动微分差分方程的小波配位法

IF 1.4 Q2 MATHEMATICS, APPLIED Results in Applied Mathematics Pub Date : 2023-12-22 DOI:10.1016/j.rinam.2023.100415
Shahid Ahmed , Shah Jahan , Khursheed J. Ansari , Kamal Shah , Thabet Abdeljawad
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引用次数: 0

摘要

本文提出了一种小波配位法,用于高效求解奇异扰动微分-差分方程(SPDDEs)和单参数奇异扰动微分方程(SPDEs),并考虑了控制系统中固有的奇异扰动。这些方程代表了一类结合了微分方程和差分方程的数学模型,因此其分析和求解具有挑战性。包含负偏移和正偏移的项采用泰勒级数展开近似。该技术的主要目的是通过使用哈尔小波积分运算矩阵将问题转换为代数方程系统,并使用牛顿法求解。小波函数的适应性和多分辨率特性能够捕捉不同尺度的系统行为,有效处理方程中存在的奇异扰动。通过数值实验,展示了小波配位法的有效性和准确性,证明了它作为分析和解决控制系统中 SPDDE 的可靠工具的潜力。
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Wavelets collocation method for singularly perturbed differential–difference equations arising in control system

In this paper, we present a wavelet collocation method for efficiently solving singularly perturbed differential–difference equations (SPDDEs) and one-parameter singularly perturbed differential equations (SPDEs) taking into account the singular perturbations inherent in control systems. These equations represent a class of mathematical models that exhibit a combination of differential and difference equations, making their analysis and solution challenging. The terms that include negative and positive shifts were approximated using Taylor series expansion. The main aim of this technique is to convert the problems by using operational matrices of integration of Haar wavelets into a system of algebraic equations that can be solved using Newton’s method. The adaptability and multi-resolution properties of wavelet functions offer the ability to capture system behavior across various scales, effectively handling singular perturbations present in the equations. Numerical experiments were conducted to showcase the effectiveness and accuracy of the wavelet collocation method, demonstrating its potential as a reliable tool for analyzing and solving SPDDEs in control system.

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来源期刊
Results in Applied Mathematics
Results in Applied Mathematics Mathematics-Applied Mathematics
CiteScore
3.20
自引率
10.00%
发文量
50
审稿时长
23 days
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