Chinese Quarterly Journal of Mathematics ›› 2008, Vol. 23 ›› Issue (2): 165-170.

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A Class of Third-order Convergence Variants of Newton’s Method 

  

  1. Department of Mathematics and Information Science,Zhengzhou Institute of Light Industry
  • Received:2007-05-23 Online:2008-06-30 Published:2023-09-27
  • About author:ZHAO Ling-ling(1966-), female, native of Qinyang, Henan, an associate professor of Zhengzhou Institute of Light Industry, engages in functional theory and applied mathematics; WANG Xia(1970-), female, native of Kaifeng, Henan, an associate professor of Zhengzhou Institute of Light Industry, engages in computed mathematics.
  • Supported by:
    Supported by the National Science Foundation of China(10701066)

Abstract: A class of third-order convergence methods of solving roots for non-linear equation,which are variant Newton’s method, are given. Their convergence properties are proved. They are at least third order convergence near simple root and one order convergence near multiple roots. In the end, numerical tests are given and compared with other known Newton’s methods. The results show that the proposed methods have some more advantages than others. They enrich the methods to find the roots of non-linear equations and they are important in both theory and application. 

Key words: variant Newton’s methods, third-order convergence, numerical test

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