Some Iteration Methods with High-Order Convergence for Nonlinear Equations

T Zhanlav; Жанлав Т; O Chuluunbaatar; Чулуунбаатар О

Some Iteration Methods with High-Order Convergence for Nonlinear Equations

Authors: Zhanlav T¹, Chuluunbaatar O²
Affiliations:
1. National University of Mongolia
2. Joint Institute for Nuclear Research
Issue: No 4 (2009)
Pages: 47-55
Section: Articles
URL: https://journals.rudn.ru/miph/article/view/8478

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Abstract

In this paper the iteration methods with high-order convergence for nonlinear equations are studied. It is shown that all the iteration methods with third-order convergence are equivalent to the standard Tchebyshev method. The acceleration of the convergence of the Newton method is also considered. New iteration methods on the procedure discussed above are proposed. Comparison between different iteration methods is given by test examples.

Keywords

Newton method, iteration methods

About the authors

T Zhanlav

National University of Mongolia

Факультет математики и компьютерных наук; Монгольский государственный университет; National University of Mongolia

O Chuluunbaatar

Joint Institute for Nuclear Research

Лаборатория информационных технологий; Объединённый институт ядерных исследований; Joint Institute for Nuclear Research

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Vol 32, No 3 (2024)

Some Iteration Methods with High-Order Convergence for Nonlinear Equations

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Abstract

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About the authors

T Zhanlav

O Chuluunbaatar

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