Ponencia de la conferencia "International Conference of Numerical Analysis and Applied Mathematics, ICNAAM 2017; The MET HotelThessaloniki; Greece; 25 September 2017 through 30 September 2017"We present the local convergence analysis and the study of the dynamics of a higher order iterative method in order to approximate a locally unique solution of multiplicity greater than one of a nonlinear equation. The convergence is obtained by means of using a center-Hölder condition in which the ball of convergence is greater than in previous studies. Moreover, the dynamics of the method are also presented. Numerical examples validating the theoretical results are also provided
In this work we introduce a new form of setting the general assumptions for the local convergence st...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
Capítulo del libro "Iterative Methods and Their Dynamics with Applications: A Contemporary Study"Let...
The study of the dynamics and the analysis of local convergence of an iterative method, when approxi...
The study of the dynamics and the analysis of local convergence of an iterative method, when approxi...
Solving problems in various disciplines such as biology, chemistry, economics, medicine, physics, an...
We study the local convergence of a method presented by Cordero et al. of convergence order at least...
In this study, we suggested the local convergence of three iterative schemes that works for systems ...
In this paper, we present the study of the local convergence of a higher-order family of methods. Mo...
We study the local convergence of Chebyshev–Halley methods with six and eight order of convergence t...
In this paper we present and analyze a set of predictor-corrector iterative methods with increasing ...
[EN] A set of multistep iterative methods with increasing order of convergence is presented, for sol...
The main contribution of this study is to present a new optimal eighth-order scheme for locating zer...
Numerous three-step methods of high convergence order have been developed to produce sequences appro...
We present a local convergence analysis of an eighth order three step methodin order to approximate ...
In this work we introduce a new form of setting the general assumptions for the local convergence st...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
Capítulo del libro "Iterative Methods and Their Dynamics with Applications: A Contemporary Study"Let...
The study of the dynamics and the analysis of local convergence of an iterative method, when approxi...
The study of the dynamics and the analysis of local convergence of an iterative method, when approxi...
Solving problems in various disciplines such as biology, chemistry, economics, medicine, physics, an...
We study the local convergence of a method presented by Cordero et al. of convergence order at least...
In this study, we suggested the local convergence of three iterative schemes that works for systems ...
In this paper, we present the study of the local convergence of a higher-order family of methods. Mo...
We study the local convergence of Chebyshev–Halley methods with six and eight order of convergence t...
In this paper we present and analyze a set of predictor-corrector iterative methods with increasing ...
[EN] A set of multistep iterative methods with increasing order of convergence is presented, for sol...
The main contribution of this study is to present a new optimal eighth-order scheme for locating zer...
Numerous three-step methods of high convergence order have been developed to produce sequences appro...
We present a local convergence analysis of an eighth order three step methodin order to approximate ...
In this work we introduce a new form of setting the general assumptions for the local convergence st...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
Capítulo del libro "Iterative Methods and Their Dynamics with Applications: A Contemporary Study"Let...