关于误差的概化和误差估计过程的Ortiz递归公式的tau方法

B.M. Yisa, R.B. Adeniyi
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引用次数: 0

摘要

本文推广了一般非过定常微分方程中tau方法的Lanczos-Ortiz递推公式。这些作者在早期的著作中报道了典型多项式及其导数在超定和非超定情况下的泛化,因此这里的重点是误差和误差估计程序。通过数值算例和归纳原理,验证了计算结果的准确性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On the generalization of the error and error estimation process of Ortiz’s recursive formulation of the tau method

In this paper, the generalization of the Lanczos–Ortiz’s Recursive formulation of the tau method for general non-overdetermined ordinary differential equations is presented. The generalization of the canonical polynomials and their derivatives for both overdetermined and non-overdetermined cases were reported in the earlier works of these authors, thus the emphasis here is on the error and the error estimate procedures. The accuracy of the results were established using some numerical examples and the induction principle.

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