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- Title
Method of Third-Order Convergence with Approximation of Inverse Operator for Large Scale Systems.
- Authors
Argyros, Ioannis K.; Shakhno, Stepan; Yarmola, Halyna
- Abstract
A vital role in the dynamics of physical systems is played by symmetries. In fact, these studies require the solution for systems of equations on abstract spaces including on the finite-dimensional Euclidean, Hilbert, or Banach spaces. Methods of iterative nature are commonly used to determinate the solution. In this article, such methods of higher convergence order are studied. In particular, we develop a two-step iterative method to solve large scale systems that does not require finding an inverse operator. Instead of the operator's inverting, it uses a two-step Schultz approximation. The convergence is investigated using Lipschitz condition on the first-order derivatives. The cubic order of convergence is established and the results of the numerical experiment are given to determine the real benefits of the proposed method.
- Subjects
LARGE scale systems; BANACH spaces
- Publication
Symmetry (20738994), 2020, Vol 12, Issue 6, p978
- ISSN
2073-8994
- Publication type
Article
- DOI
10.3390/sym12060978