The main contribution of this study is to present a new optimal eighth-order scheme for locating zeros with multiplicity m≥1. An extensive convergence analysis is presented with the main theorem in order to demonstrate the optimal eighth-order convergence of the proposed scheme. Moreover, a local convergence study for the optimal fourth-order method defined by the first two steps of the new method is presented, allowing us to obtain the radius of the local convergence ball. Finally, numerical tests on some real-life problems, such as a Van der Waals equation of state, a conversion chemical engineering problem, and two standard academic test problems, are presented, which confirm the theoretical results established in this paper and the effi...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
We study the local convergence of a Newton-like method of convergence order six to approximate a loc...
Ponencia de la conferencia "International Conference of Numerical Analysis and Applied Mathematics, ...
We present a local convergence analysis of an eighth-order method for approximating a locally unique...
We study the local convergence of an eighth order Newton-like method to approximate a locally-unique...
AbstractA family of eighth-order iterative methods for the solution of nonlinear equations is presen...
In this paper, we propose a local convergence analysis of an eighth order three-step method to appro...
In this paper, a new family of optimal eighth-order iterative methods are presented. The new family ...
The aim of this study is to extend the applicability of an eighth convergence order method from the ...
There are a few optimal eighth order methods in literature for computing multiple zeros of a nonlin...
The aims of this paper are, firstly, to define a new family of the Thukral and Petkovic type methods...
We develop a new families of optimal eight--order methods for solving nonlinear equations. We also e...
In this manuscript, we present a new general family of optimal iterative methods for finding multipl...
We present a local convergence analysis for a family of Steffensen-type fourth-order methods in orde...
Abstract In this paper we established a new eighth-order iterative method, consisting of three steps...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
We study the local convergence of a Newton-like method of convergence order six to approximate a loc...
Ponencia de la conferencia "International Conference of Numerical Analysis and Applied Mathematics, ...
We present a local convergence analysis of an eighth-order method for approximating a locally unique...
We study the local convergence of an eighth order Newton-like method to approximate a locally-unique...
AbstractA family of eighth-order iterative methods for the solution of nonlinear equations is presen...
In this paper, we propose a local convergence analysis of an eighth order three-step method to appro...
In this paper, a new family of optimal eighth-order iterative methods are presented. The new family ...
The aim of this study is to extend the applicability of an eighth convergence order method from the ...
There are a few optimal eighth order methods in literature for computing multiple zeros of a nonlin...
The aims of this paper are, firstly, to define a new family of the Thukral and Petkovic type methods...
We develop a new families of optimal eight--order methods for solving nonlinear equations. We also e...
In this manuscript, we present a new general family of optimal iterative methods for finding multipl...
We present a local convergence analysis for a family of Steffensen-type fourth-order methods in orde...
Abstract In this paper we established a new eighth-order iterative method, consisting of three steps...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
We study the local convergence of a Newton-like method of convergence order six to approximate a loc...
Ponencia de la conferencia "International Conference of Numerical Analysis and Applied Mathematics, ...