[EN] A general optimal iterative method, for approximating the solution of nonlinear equations, of (n+1) steps with 2(n+1) order of convergence is presented. Cases n=0 and n=1 correspond to Newton's and Ostrowski's schemes, respectively. The basins of attraction of the proposed schemes on different test functions are analyzed and compared with the corresponding to other known methods. The dynamical planes showing the different symmetries of the basins of attraction of new and known methods are presented. The performance of different methods on some test functions is shown.This research was partially supported by PGC2018-095896-B-C22 (MCIU/AEI/FEDER, UE).Cordero Barbero, A.; Torregrosa Sánchez, JR.; Triguero-Navarro, P. (2021). A General Opt...
Abstract: In this report, we presented three high-order iterative methods for solving nonlinear equa...
[EN] Research interest in iterative multipoint schemes to solve nonlinear problems has increased rec...
Iterative methods have been a very important area of study in numerical analysis since the inception...
[EN] We present a new Jarratt-type family of optimal fourth- and sixth-order iterative methods for s...
[EN] Many iterative methods for solving nonlinear equations have been developed recently. The main a...
AbstractIn this work we introduce a technique for solving nonlinear systems that improves the order ...
In this paper, based on Ostrowski's method, a new family of eighth-order methods for solving nonline...
[EN] Recently, Li et al. (2014) have published a new family of iterative methods, without memory, w...
[EN] We used a Kurchatov-type accelerator to construct an iterative method with memory for solving n...
Two new three-step classes of optimal iterative methods to approximate simple roots of nonlinear equ...
This is an Author's Accepted Manuscript of an article published in José L. Hueso, Eulalia Martínez ...
Recently, there has been progress in developing Newton-type methods with higher convergence to solve...
AbstractWe present a new iterative method of order of convergence 5, for solving nonlinear systems, ...
[EN] A set of multistep iterative methods with increasing order of convergence is presented, for sol...
AbstractWe provide an iterative method which is of S-order 5, but N-order 4. We also give a numerica...
Abstract: In this report, we presented three high-order iterative methods for solving nonlinear equa...
[EN] Research interest in iterative multipoint schemes to solve nonlinear problems has increased rec...
Iterative methods have been a very important area of study in numerical analysis since the inception...
[EN] We present a new Jarratt-type family of optimal fourth- and sixth-order iterative methods for s...
[EN] Many iterative methods for solving nonlinear equations have been developed recently. The main a...
AbstractIn this work we introduce a technique for solving nonlinear systems that improves the order ...
In this paper, based on Ostrowski's method, a new family of eighth-order methods for solving nonline...
[EN] Recently, Li et al. (2014) have published a new family of iterative methods, without memory, w...
[EN] We used a Kurchatov-type accelerator to construct an iterative method with memory for solving n...
Two new three-step classes of optimal iterative methods to approximate simple roots of nonlinear equ...
This is an Author's Accepted Manuscript of an article published in José L. Hueso, Eulalia Martínez ...
Recently, there has been progress in developing Newton-type methods with higher convergence to solve...
AbstractWe present a new iterative method of order of convergence 5, for solving nonlinear systems, ...
[EN] A set of multistep iterative methods with increasing order of convergence is presented, for sol...
AbstractWe provide an iterative method which is of S-order 5, but N-order 4. We also give a numerica...
Abstract: In this report, we presented three high-order iterative methods for solving nonlinear equa...
[EN] Research interest in iterative multipoint schemes to solve nonlinear problems has increased rec...
Iterative methods have been a very important area of study in numerical analysis since the inception...