Title of article
Geometric mean Newton’s method for simple and multiple roots Original Research Article
Author/Authors
Tibor Luki?، نويسنده , , Nebojsa M. Ralevic، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
7
From page
30
To page
36
Abstract
In this work we consider the convergence behavior of a variant of Newton’s method based on the geometric mean. The convergence properties of this method for solving equations which have simple or multiple roots have been discussed and it has been shown that it converges cubically to simple roots and linearly to multiple roots. Moreover, the values of the corresponding asymptotic error constants of convergence are determined. Theoretical results have been verified on the relevant numerical problems. A comparison of the efficiency of this method with other mean-based Newton’s methods, based on the arithmetic and harmonic means, is also included.
Keywords
Newton’s method , Iterative methods , Mean-based Newton’s method , order of convergence , Asymptotic error constant
Journal title
Applied Mathematics Letters
Serial Year
2008
Journal title
Applied Mathematics Letters
Record number
898526
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