Enlarging the convergence domain in local convergence studies for iterative methods in Banach spaces
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摘要
In this work we introduce a new form of setting the general assumptions for the local convergence studies of iterative methods in Banach spaces that allows us to improve the convergence domains. Specifically a local convergence result for a family of higher order iterative methods for solving nonlinear equations in Banach spaces is established under the assumption that the Fréchet derivative satisfies the Lipschitz continuity condition. For some values of the parameter, these iterative methods are of fifth order. The importance of our work is that it avoids the usual practice of boundedness conditions of higher order derivatives which is a drawback for solving some practical problems. The existence and uniqueness theorem that establishes the convergence balls of these methods is obtained.We have considered a number of numerical examples including a nonlinear Hammerstein equation and computed the radii of the convergence balls. It is found that the radius of convergence ball obtained by our approach is much larger when compared with some other existing methods.The global convergence properties of the family are explored by analyzing the dynamics of the corresponding operator on complex quadratic polynomials.
论文关键词:Nonlinear equations,Local convergence,Banach space,Hammerstein integral equation,Lipschitz condition,Complex dynamics
论文评审过程:Received 16 December 2015, Revised 13 January 2016, Accepted 17 January 2016, Available online 18 February 2016, Version of Record 18 February 2016.
论文官网地址:https://doi.org/10.1016/j.amc.2016.01.036