A New Higher-Order Scheme for Multiple Roots with Unknown Multiplicity

Lama Alhaj  Mohammad; Ishak  Hashim; Faieza  Samat

doi:10.37256/cm.6220256029

Authors

Lama Alhaj Mohammad Department of Mathematical Sciences, Faculty of Science and Technology, National University of Malaysia, 43600, UKM Bangi Selangor, Malaysia https://orcid.org/0009-0006-9408-1519
Ishak Hashim Department of Mathematical Sciences, Faculty of Science and Technology, National University of Malaysia, 43600, UKM Bangi Selangor, Malaysia https://orcid.org/0000-0003-4237-7140
Faieza Samat Pusat GENIUSPintar Negara, National University of Malaysia, 43600, UKM Bangi Selangor, Malaysia https://orcid.org/0000-0001-8674-2934

DOI:

https://doi.org/10.37256/cm.6220256029

Keywords:

multiple roots, nonlinear equations, unknown multiplicity, high-order convergence, iterative method

Abstract

In this work, we propose a new efficient iterative method to find multiple roots of nonlinear equations with unknown multiplicity n. The new scheme is free from the second derivative and consists of three steps derived from Enhanced Halley’s method introduced by the contributors and a Newton step. To increase efficiency, the first derivatives were approximated using forward difference, central difference, and Hermite interpolation techniques. It is demonstratedthat the implemented method achieves sixth order of convergence. As an application, we apply the new method to chemical engineering problem (volume from van der Waals), biomedical engineering (blood rheology model) and ten academic problems. Comparisons and examples clarify that the new method outperforms existing methods with the same order of convergence.

A New Higher-Order Scheme for Multiple Roots with Unknown Multiplicity

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