Initial Value Solvers for Direct Solution of Fourth Order Ordinary Differential Equations in a Block from Using Chebyshev Polynomial as Basis Function

M. Alabi, M. S. Olaleye, K. S. Adewoye
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Abstract

The numerical computation of fourth order ordinary differential equations cannot be gloss over easily due to its significant and importance. There have been glowing needs to find an appropriate numerical method that will handle effectively fourth order ordinary differential equations without resolving such an equation to a system of first order ordinary differential equations. To this end, this presentation focuses on direct numerical computation to fourth order ordinary differential equations without resolving such equations to a system of first order ordinary differential equations. The method is not predictor – corrector one due to its limitation in the level of accuracy. The method is order wise christened “Block Method” which is a self-starting method. In order to achieve this objective, Chebyshev polynomial is hereby used as basis function.
使用切比雪夫多项式作为基函数直接求解分块四阶常微分方程的初值求解器
四阶常微分方程的数值计算因其重要性而不容忽视。人们亟需找到一种适当的数值方法,在不将四阶常微分方程解析为一阶常微分方程系统的情况下,有效地处理四阶常微分方程。为此,本报告将重点介绍在不将四阶常微分方程解析为一阶常微分方程系统的情况下直接对其进行数值计算的方法。由于其精度水平的限制,该方法不是预测-修正方法。该方法按顺序命名为 "Block 法",是一种自启动方法。为了实现这一目标,这里使用切比雪夫多项式作为基函数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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