A new efficient two-step iterative method for solving absolute value equations

IF 1.5 4区 工程技术 Q3 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS
Alamgir Khan, Javed Iqbal, Rasool Shah
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引用次数: 0

Abstract

Purpose

This study presents a two-step numerical iteration method specifically designed to solve absolute value equations. The proposed method is valuable and efficient for solving absolute value equations. Several numerical examples were taken to demonstrate the accuracy and efficiency of the proposed method.

Design/methodology/approach

We present a two-step numerical iteration method for solving absolute value equations. Our two-step method consists of a predictor-corrector technique. The new method uses the generalized Newton method as the predictor step. The four-point open Newton-Cotes formula is considered the corrector step. The convergence of the proposed method is discussed in detail. This new method is highly effective for solving large systems due to its simplicity and effectiveness. We consider the beam equation, using the finite difference method to transform it into a system of absolute value equations, and then solve it using the proposed method.

Findings

The paper provides empirical insights into how to solve a system of absolute value equations.

Originality/value

This paper fulfills an identified need to study absolute value equations.

求解绝对值方程的新型高效两步迭代法
目的 本研究提出了一种专门用于求解绝对值方程的两步数值迭代法。所提出的方法对于求解绝对值方程具有重要价值和效率。我们提出了一种求解绝对值方程的两步数值迭代法。我们的两步法由预测-修正技术组成。新方法使用广义牛顿法作为预测步骤。四点开放牛顿-科茨公式被视为校正步骤。本文详细讨论了所提方法的收敛性。这种新方法简单有效,对求解大型系统非常有效。我们考虑了梁方程,使用有限差分法将其转化为绝对值方程组,然后使用提出的方法求解。
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来源期刊
Engineering Computations
Engineering Computations 工程技术-工程:综合
CiteScore
3.40
自引率
6.20%
发文量
61
审稿时长
5 months
期刊介绍: The journal presents its readers with broad coverage across all branches of engineering and science of the latest development and application of new solution algorithms, innovative numerical methods and/or solution techniques directed at the utilization of computational methods in engineering analysis, engineering design and practice. For more information visit: http://www.emeraldgrouppublishing.com/ec.htm
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