关于多项式根的伯努利-欧拉-拉格朗日-艾特肯数值方法

IF 0.1 Q4 MULTIDISCIPLINARY SCIENCES DOKLADY NATSIONALNOI AKADEMII NAUK BELARUSI Pub Date : 2023-10-30 DOI:10.29235/1561-8323-2023-67-359-365

A. V. Lebedev, Yu. V. Trubnikov, M. M. Chernyavsky

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摘要

本文提出了欧拉-拉格朗日方法的发展，用于计算具有复系数的任意多项式P(z)的所有根，该方法基于计算行列式比值的极限(如在伯努利-艾特肯-尼基波特方法中)，该方法是通过函数P ' (z) / P(z)的泰勒和劳伦级数系数建立的。

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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On the Bernoulli–Euler–Lagrange–Aitken numerical method for roots of polynomials

The article presents a development of the Euler–Lagrange method for calculation of all roots of an arbitrary polynomial P(z) with complex coefficients based on the calculation of the limits of ratios of determinants (as in the Bernoulli–Aitken–Nikiporets methods) built by means of the Taylor and Laurent series coefficients for the function P′(z) / P(z).

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DOKLADY NATSIONALNOI AKADEMII NAUK BELARUSI MULTIDISCIPLINARY SCIENCES-

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