Open AccessUnified Convergence Analysis of Two-Step Iterative Methods for Solving Equations
Author(s) -
Ioannis K. Argyros
Publication year - 2021
Publication title -
european journal of mathematical analysis
Language(s) - English
Resource type - Journals
ISSN - 2733-3957
DOI - 10.28924/ada/ma.1.68
Subject(s) - local convergence , convergence (economics) , modes of convergence (annotated index) , convergence tests , banach space , compact convergence , differentiable function , mathematics , unconditional convergence , normal convergence , weak convergence , fréchet derivative , taylor series , complement (music) , limit (mathematics) , iterative method , mathematical optimization , computer science , mathematical analysis , rate of convergence , pure mathematics , key (lock) , isolated point , asset (computer security) , economic growth , chemistry , phenotype , computer security , topological vector space , biochemistry , topological space , complementation , economics , gene
In this paper we consider unified convergence analysis of two-step iterative methods for solving equations in the Banach space setting. The convergence order four was shown using Taylor expansions requiring the existence of the fifth derivative not on this method. But these hypotheses limit the utilization of it to functions which are at least five times differentiable although the method 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 differences which appear on 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.