Based on Traub-Steffensen method, we present a derivative free three-step family of sixth-order methods for solving systems of nonlinear equations. The local convergence order of the family is determined using first-order divided difference operator for functions of several variables and direct computation by Taylor's expansion. Computational efficiency is discussed, and a comparison between the efficiencies of the proposed techniques with the existing ones is made. Numerical tests are performed to compare the methods of the proposed family with the existing methods and to confirm the theoretical results. It is shown that the new family is especially efficient in solving large systems
[EN] In the present paper, by approximating the derivatives in the well known fourth-order Ostrowski...
A local convergence analysis for a generalization of a family of Ste ensen-type iterative methods wi...
In this study, we present a new highly efficient sixth-order family of iterative methods for solving...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
Based on Traub-s methods for solving nonlinear equation f(x) = 0, we develop two families of third-o...
AbstractIn the present paper, by approximating the derivatives in the well known fourth-order Ostrow...
The family of fourth-order Steffensen-type methods proposed by Zheng et al. (Appl. Math. Comput. 217...
In this paper, a family of Steffensen type methods of fourth-order convergence for solving nonlinear...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
In this paper, we present a new sixth-order iterative method for solving nonlinear systems and prove...
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...
[EN] In this paper, a three-step iterative method with sixth-order local convergence for approximati...
A plethora of applications from Computational Sciences can be identified for a system of nonlinear e...
The paper is devoted to the construction of economical explicit sixth-order numerical method for so...
This article discusses a derivative free three-step iterative method to solve a nonlinear equation u...
[EN] In the present paper, by approximating the derivatives in the well known fourth-order Ostrowski...
A local convergence analysis for a generalization of a family of Ste ensen-type iterative methods wi...
In this study, we present a new highly efficient sixth-order family of iterative methods for solving...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
Based on Traub-s methods for solving nonlinear equation f(x) = 0, we develop two families of third-o...
AbstractIn the present paper, by approximating the derivatives in the well known fourth-order Ostrow...
The family of fourth-order Steffensen-type methods proposed by Zheng et al. (Appl. Math. Comput. 217...
In this paper, a family of Steffensen type methods of fourth-order convergence for solving nonlinear...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
In this paper, we present a new sixth-order iterative method for solving nonlinear systems and prove...
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...
[EN] In this paper, a three-step iterative method with sixth-order local convergence for approximati...
A plethora of applications from Computational Sciences can be identified for a system of nonlinear e...
The paper is devoted to the construction of economical explicit sixth-order numerical method for so...
This article discusses a derivative free three-step iterative method to solve a nonlinear equation u...
[EN] In the present paper, by approximating the derivatives in the well known fourth-order Ostrowski...
A local convergence analysis for a generalization of a family of Ste ensen-type iterative methods wi...
In this study, we present a new highly efficient sixth-order family of iterative methods for solving...