http://scholars.ntou.edu.tw/handle/123456789/25261
Title: | Updating to Optimal Parametric Values by Memory-Dependent Methods: Iterative Schemes of Fractional Type for Solving Nonlinear Equations | Authors: | Liu, Chein-Shan Chang, Chih-Wen |
Keywords: | nonlinear equation;nonlinear perturbation of Newton method;fractional type iterative schemes;multi-step iterative scheme;memory-dependent method | Issue Date: | 2024 | Publisher: | MDPI | Journal Volume: | 12 | Journal Issue: | 7 | Source: | MATHEMATICS | Abstract: | In the paper, two nonlinear variants of the Newton method are developed for solving nonlinear equations. The derivative-free nonlinear fractional type of the one-step iterative scheme of a fourth-order convergence contains three parameters, whose optimal values are obtained by a memory-dependent updating method. Then, as the extensions of a one-step linear fractional type method, we explore the fractional types of two- and three-step iterative schemes, which possess sixth- and twelfth-order convergences when the parameters' values are optimal; the efficiency indexes are 6 and 123, respectively. An extra variable is supplemented into the second-degree Newton polynomial for the data interpolation of the two-step iterative scheme of fractional type, and a relaxation factor is accelerated by the memory-dependent method. Three memory-dependent updating methods are developed in the three-step iterative schemes of linear fractional type, whose performances are greatly strengthened. In the three-step iterative scheme, when the first step involves using the nonlinear fractional type model, the order of convergence is raised to sixteen. The efficiency index also increases to 163, and a third-degree Newton polynomial is taken to update the values of optimal parameters. |
URI: | http://scholars.ntou.edu.tw/handle/123456789/25261 | DOI: | 10.3390/math12071032 |
Appears in Collections: | 海洋中心 |
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