Abstract
Symmetries play a vital role in the study of physical systems. For example, microworld and quantum physics problems are modeled on the principles of symmetry. These problems are then formulated as equations defined on suitable abstract spaces. Most of these studies reduce to solving nonlinear equations in suitable abstract spaces iteratively. In particular, the convergence of a sixth-order Cordero type iterative method for solving nonlinear equations was studied using Taylor expansion and assumptions on the derivatives of order up to six. In this study, we obtained order of convergence six for Cordero type method using assumptions only on the first derivative. Moreover, we modified Cordero’s method and obtained an eighth-order iterative scheme. Further, we considered analogous iterative methods to solve an ill-posed problem in a Hilbert space setting.
Subject
Physics and Astronomy (miscellaneous),General Mathematics,Chemistry (miscellaneous),Computer Science (miscellaneous)
Reference15 articles.
1. Increasing the convergence order of an iterative method for nonlinear systems;Appl. Math. Lett.,2012
2. Iterative methods of order four and five for systems of nonlinear equations;J. Comput. Appl. Math.,2012
3. A modified Newton Jarratt’s composition;Numer. Algor.,2010
4. On the local convergence of a fifth-order iterative method in Banach spaces;Appl. Math. Comput.,2012
5. An efficient newton-type method with fifthorder convergence for solving nonlinear equations;Comput. Appl. Math.,2008
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