Development of a Higher-Order Iterative Method with Variable Parameters for the Roots of Starlike Functions

Authors

  • Asma A. Almahrouq Department of Mathematics, Faculty of Science, University of Sabratha, Libya
  • Salma F. R. Naji Department of Mathematics, Faculty of Science, University of Sabratha, Libya
  • M. Darus School of Mathematical Sciences, Faculty of Science and Technology, University Kebangsaan Malaysia, 43600 UKM Bangi, Selangor DE, Malaysia

Keywords:

Starlike function; Iterative methods; Nonlinear equations; Order of convergence; Numerical stability

Abstract

In this present paper, a new iterative scheme is obtained, designed to compute the roots of starlike functions and to address the constrains faced by traditional iterative algorithms when dealing with this specific class of functions. This is achieved by combining the development formula with coefficients of the variable m and α, which demonstrating that both the order of convergence and computational efficiency improve as these coefficients increase. The numerical examples confirm the proposed scheme's ability to solve the drawbacks of classical methods, achieving high numerical efficiency and a convergence rate that is faster compared to known traditional methods.

Dimensions

Published

2026-06-09

How to Cite

Asma A. Almahrouq, Salma F. R. Naji, & M. Darus. (2026). Development of a Higher-Order Iterative Method with Variable Parameters for the Roots of Starlike Functions. African Journal of Advanced Pure and Applied Sciences, 5(2), 238–242. Retrieved from https://aaasjournals.com/index.php/ajapas/article/view/2022

Issue

Volume 5, Issue 2, 2026

Section

Articles
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