A modified Newton-type method with sixth-order convergence for solving nonlinear equations

被引：1

作者：

Fang, Liang ^{[1
]}

Chen, Tao ^{[1
]}

Tian, Li ^{[1
]}

Sun, Li ^{[1
]}

Chen, Bin ^{[2
]}

机构：

[1] Taishan Univ, Coll Math & Syst Sci, Tai An 271021, Shandong, Peoples R China

[2] Taishan Expt Midlle Sch, Math Educ Res Group, Tai An 271000, Shandong, Peoples R China

来源：

CEIS 2011 | 2011年 / 15卷

关键词：

Newton-type method; Nonlinear equations; Order of convergence; Iterative method; Efficiency index;

D O I：

10.1016/j.proeng.2011.08.586

中图分类号：

TP [自动化技术、计算机技术];

学科分类号：

0812 ;

摘要：

In this paper, we present and analyze a sixth-order convergent iterative method for solving nonlinear equations. The method is free from second derivatives and permits f'(x) = 0 in iteration points. Some numerical examples illustrate that the presented method is more efficient and performs better than classical Newton's method. (C) 2011 Published by Elsevier Ltd. Selection and/or peer-review under responsibility of [CEIS 2011]

引用

页数：5

共 50 条

[41] Derivative free Newton-type method for fuzzy nonlinear equations
Aal, Mohammad Abdel
JOURNAL OF MATHEMATICS AND COMPUTER SCIENCE-JMCS, 2024, 34 (03): : 234 - 242
[42] Generalized conformable fractional Newton-type method for solving nonlinear systems
Candelario, Giro
Cordero, Alicia
Torregrosa, Juan R. R.
Vassileva, Maria P.
NUMERICAL ALGORITHMS, 2023, 93 (03) : 1171 - 1208
[43] On the local convergence of efficient Newton-type solvers with frozen derivatives for nonlinear equations
Behl, Ramandeep
Argyros, Ioannis K.
Argyros, Christopher, I
COMPUTATIONAL AND MATHEMATICAL METHODS, 2021, 3 (06)
[44] SUPERLINEAR CONVERGENCE THEOREMS FOR NEWTON-TYPE METHODS FOR NONLINEAR-SYSTEMS OF EQUATIONS
ABAFFY, J
JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS, 1992, 73 (02) : 269 - 277
[45] Generalized conformable fractional Newton-type method for solving nonlinear systems
Giro Candelario
Alicia Cordero
Juan R. Torregrosa
María P. Vassileva
Numerical Algorithms, 2023, 93 : 1171 - 1208
[46] A simple efficient method for solving sixth-order nonlinear boundary value problems
Dang Quang A
Dang Quang Long
COMPUTATIONAL & APPLIED MATHEMATICS, 2018, 37 : 16 - 26
[47] On a unified convergence analysis for Newton-type methods solving generalized equations with the Aubin property
Argyros, Ioannis K.
George, Santhosh
JOURNAL OF COMPLEXITY, 2024, 81
[48] SOME NEWTON-TYPE ITERATIVE METHODS WITH AND WITHOUT MEMORY FOR SOLVING NONLINEAR EQUATIONS
Wang, Xiaofeng
Zhang, Tie
INTERNATIONAL JOURNAL OF COMPUTATIONAL METHODS, 2014, 11 (05)
[49] On Chebyshev-Halley methods with sixth-order convergence for solving non-linear equations
Kou, Jisheng
APPLIED MATHEMATICS AND COMPUTATION, 2007, 190 (01) : 126 - 131
[50] Convergence analysis of a variant of the Newton method for solving nonlinear equations
Lin, Yiqin
Bao, Liang
Jia, Xianzheng
COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2010, 59 (06) : 2121 - 2127

← 1 2 3 4 5 →