ON SEMILOCAL CONVERGENCE OF INEXACT NEWTON METHODS 被引量：7

ON SEMILOCAL CONVERGENCE OF INEXACT NEWTON METHODS

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摘要 Inexact Newton methods are constructed by combining Newton＇s method with another iterative method that is used to solve the Newton equations inexactly. In this paper, we establish two semilocal convergence theorems for the inexact Newton methods. When these two theorems are specified to Newton＇s method, we obtain a different Newton-Kantorovich theorem about Newton＇s method. When the iterative method for solving the Newton equations is specified to be the splitting method, we get two estimates about the iteration steps for the special inexact Newton methods. Inexact Newton methods are constructed by combining Newton＇s method with another iterative method that is used to solve the Newton equations inexactly. In this paper, we establish two semilocal convergence theorems for the inexact Newton methods. When these two theorems are specified to Newton＇s method, we obtain a different Newton-Kantorovich theorem about Newton＇s method. When the iterative method for solving the Newton equations is specified to be the splitting method, we get two estimates about the iteration steps for the special inexact Newton methods.

作者 Xueping Guo

机构地区 Department of Mathematics

出处《Journal of Computational Mathematics》 SCIE EI CSCD 2007年第2期231-242,共12页 计算数学（英文）

基金 Supported by State Key Laboratory of Scientific/Engineering Computing,Chinese Academy of Sciences the National Natural Science Foundation of China (10571059,10571060).

关键词 Banach space Systems of nonlinear equations Newton＇s method The splittingmethod Inexact Newton methods Banach space, Systems of nonlinear equations, Newton＇s method, The splittingmethod, Inexact Newton methods

分类号 O241.7 [理学—计算数学]

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共引文献51

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同被引文献4

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