DocumentCode
3238255
Title
A new modified king-werner method solving nonlinear equations
Author
Chen, Liang ; Gu, Chuanqing
Author_Institution
Dept. of Math., Shanghai Univ., Shanghai, China
fYear
2011
fDate
27-29 May 2011
Firstpage
486
Lastpage
489
Abstract
In this paper, a new method for solving nonlinear equations f(x) = 0 is presented. Analysis of the convergence shows that the asymptotic convergence order of this method is 1 + √3. Some numerical results are given to demonstrate its efficiency.
Keywords
convergence of numerical methods; nonlinear equations; King-Werner method; asymptotic convergence order; convergence analysis; nonlinear equation; Zinc; Iterative method; King-Werner method; Nonlinear equations; Root-finding; Secant method;
fLanguage
English
Publisher
ieee
Conference_Titel
Communication Software and Networks (ICCSN), 2011 IEEE 3rd International Conference on
Conference_Location
Xi´an
Print_ISBN
978-1-61284-485-5
Type
conf
DOI
10.1109/ICCSN.2011.6014615
Filename
6014615
Link To Document