On the local convergence and the dynamics of Chebyshev–Halley methods with six and eight order of convergence

On the local convergence and the dynamics of Chebyshev–Halley methods with six and eight order of convergence

We study the local convergence of Chebyshev–Halley methods with six and eight order of convergence to approximate a locally unique solution of a nonlinear equation. In Sharma (2015) (see Theorem 1, p. 121) the convergence of the method was shown under hypotheses reaching up to the third derivative....

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Veröffentlicht in:Journal of computational and applied mathematics 2016-05, Vol.298, p.236-251
Hauptverfasser: Magreñán, Á. Alberto, Argyros, Ioannis K.
Format: Artikel
Sprache:eng
Schlagworte:
Approximation
Chebyshev approximation
Chebyshev–Halley methods
Convergence
Derivatives
Dynamics of a method
Hypotheses
Local convergence
Mathematical analysis
Mathematical models
Nonlinear dynamics
Order of convergence
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Zusammenfassung:We study the local convergence of Chebyshev–Halley methods with six and eight order of convergence to approximate a locally unique solution of a nonlinear equation. In Sharma (2015) (see Theorem 1, p. 121) the convergence of the method was shown under hypotheses reaching up to the third derivative. The convergence in this study is shown under hypotheses on the first derivative. Hence, the applicability of the method is expanded. The dynamics of these methods are also studied. Finally, numerical examples examining dynamical planes are also provided in this study to solve equations in cases where earlier studies cannot apply.
ISSN:0377-0427
1879-1778
DOI:10.1016/j.cam.2015.11.036