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Extended Kung–Traub Methods for Solving Equations with Applications

Author

Listed:
  • Samundra Regmi

    (Learning Commons, University of North Texas at Dallas, Dallas, TX 75201, USA)

  • Ioannis K. Argyros

    (Department of Mathematical Sciences, Cameron University, Lawton, OK 73505, USA)

  • Santhosh George

    (Department of Mathematical and Computational Sciences, National Institute of Technology Karnataka, Mangalore 575025, India)

  • Ángel Alberto Magreñán

    (Departamento de Matemáticas y Computación, Universidad de La Rioja, 26006 Logroño, Spain)

  • Michael I. Argyros

    (Department of Computer Science, University of Oklahoma, Norman, OK 73701, USA)

Abstract

Kung and Traub (1974) proposed an iterative method for solving equations defined on the real line. The convergence order four was shown using Taylor expansions, requiring the existence of the fifth derivative not in this method. However, these hypotheses limit the utilization of it to functions that are at least five times differentiable, although the methods may converge. As far as we know, no semi-local convergence has been given in this setting. Our goal is to extend the applicability of this method in both the local and semi-local convergence case and in the more general setting of Banach space valued operators. Moreover, we use our idea of recurrent functions and conditions only on the first derivative and divided difference, which appear in the method. This idea can be used to extend other high convergence multipoint and multistep methods. Numerical experiments testing the convergence criteria complement this study.

Suggested Citation

  • Samundra Regmi & Ioannis K. Argyros & Santhosh George & Ángel Alberto Magreñán & Michael I. Argyros, 2021. "Extended Kung–Traub Methods for Solving Equations with Applications," Mathematics, MDPI, vol. 9(20), pages 1-15, October.
    • Handle: RePEc:gam:jmathe:v:9:y:2021:i:20:p:2635-:d:659742
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