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On convergence of the modified Newton’s method under Hölder continuous Fréchet derivative |
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| Authors: | Hongmin Ren |
| Affiliation: | a Department of Information and Electronics, Hangzhou Radio and TV University, Hangzhou 310012, Zhejiang, PR China b Department of Mathematical Sciences, Cameron University, Lawton, OK 73505, USA |
| Abstract: | In this paper, the upper and lower estimates of the radius of the convergence ball of the modified Newton’s method in Banach space are provided under the hypotheses that the Fréchet derivative of the nonlinear operator are center Hölder continuous for the initial point and the solution of the operator. The error analysis is given which matches the convergence order of the modified Newton’s method. The uniqueness ball of solution is also established. Numerical examples for validating the results are also provided, including a two point boundary value problem. |
| Keywords: | The modified Newton&rsquo s method Banach space Fré chet derivative Hö lder continuity Local convergence Radius of convergence Newton&rsquo s method |
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