Iterative solution of nonlinear equations in several variables
Iterative solution of nonlinear equations in several variables
A three-step iterative method for non-linear systems with sixth order of convergence
International Journal of Computing Science and Mathematics
| Hi-index | 0.00 |
This paper is a review of the authors' results on the Dynamical Systems Method (DSM) for solving operator equation (*) F(u) = f. It is assumed that (*) is solvable. The novel feature of the results is the minimal assumption on the smoothness of F. It is assumed that F is continuously Frechet differentiable, but no smoothness assumptions on F′(u) are imposed. The DSM for solving equation (*) is developed. Under weak assumptions global existence of the solution u(t) is proved, the existence of u(∞) is established, and the relation F(u(∞)) = f is obtained. The DSM is developed for a stable solution of equation (*) when noisy data fδ are given, "f − fδ" ≤ δ.