New Family of Combined Iterative Methods for Solving Nonlinear Equations

Author

Chen, Shuping ; Gao, Fabao ; Zhang, Wei ; Yao, Minghui

Author_Institution

Coll. of Mech. Eng., Beijing Univ. of Technol., Beijing, China

Volume

1

fYear

2009

fDate

24-26 April 2009

Firstpage

547

Lastpage

550

Abstract

In this paper, a new family of combined iterative methods for the solution of nonlinear equations is presented.The new family of methods is based on Newton´s method and the family of sixth-order iterative methods developed by Chun. Per iteration the new methods require three evaluations of the function and two evaluations of its first derivative. Numerical tests show that it takes less number of iterations than Newton´s method and some methods with third-order convergence. It is found that it only adds evaluation of the function at another point but its convergence order will be increased (p+1)-order above the original level.

Keywords

convergence of numerical methods; iterative methods; nonlinear differential equations; 3rd order convergence; Newton method; family of 6th order iterative methods; nonlinear equations; Convergence of numerical methods; Educational institutions; Information analysis; Iterative methods; Mathematics; Mechanical engineering; Newton method; Nonlinear equations; Optimization methods; Testing;

fLanguage

English

Publisher

ieee

Conference_Titel

Computational Sciences and Optimization, 2009. CSO 2009. International Joint Conference on

Conference_Location

Sanya, Hainan

Print_ISBN

978-0-7695-3605-7

Type

conf

DOI

10.1109/CSO.2009.53

Filename

5193756