| Ioannis K. Argyrosy†, Stepan Shakhno‡, Halyna Yarmola§
Abstract: A study of the local and the semilocal convergence is carried out for the Chebyshev-Halley-type iterative methods under ω-type conditions. The conditions are imposed only on the first-order derivatives. In both cases, the convergence region and the region of uniqueness of the solution is established. The new technique is a usefull alternative to expensive Taylor series used to study the convergence of iterative methods requiring high order derivatives not on the methods. The results of a numerical experiment are presented to check the convergence conditions. Keywords: complete normed space, Chebyshev-Halley-type methods, local and semi-local convergence, order six. MSC: 65J15, 65H10, 65G99, 47H30. DOI 10.56082/annalsarscimath.2026.2.111 †iargyros@cameron.edu, Department of Computing and Mathematical Sciences, Cameron University, Lawton, OK 73505, USA |
PUBLISHED in Annals Academy of Romanian Scientists Series on Mathematics and Its Application,
ISSN ONLINE 2066 – 6594
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