[EN] In this paper, we have constructed a derivative¿free weighted eighth¿order iterative method with and without memory for solving nonlinear equations. This method is an optimal method as it satisfies the Kung¿Traub conjecture. We have used four accelerating parameters, a univariate and a multivariate weight function at the second and third step of the method, respectively. This method is converted into with¿memory method by approximating the parameters using Newton's interpolating polynomials of appropriate degree to increase the order of convergence to 15.51560 and the efficiency index is nearly two. Numerical comparison of our methods is done with the recent methods of respective domain.This research was partially supported by Minis...
[EN] We present new high-order optimal iterativemethods for solving a nonlinear equation, f(x) = 0, ...
Kung-Traub conjecture states that an iterative method without memory for finding the simple zero of ...
[EN] There is a very small number of higher-order iteration functions for multiple zeros whose order...
A class of optimal iterative methods for solving nonlinear equations is extended up to sixteenth-ord...
AbstractA biparametric family of four-step multipoint iterative methods of order sixteen to numerica...
[EN] The main contribution of this study is to present a new optimal eighth-order scheme for locatin...
In this paper, we present a family of optimal, in the sense of Kung-Traub's conjecture, iterative me...
[EN] In the recent literature, very few high-order Jacobian-free methods with memory for solving non...
[EN] There is a few number of optimal fourth-order iterative methods for obtaining the multiple root...
[EN] The aim of this paper is to introduce new high order iterative methods for multiple roots of th...
In this manuscript, a new parametric class of iterative methods for solving nonlinear systems of equ...
AbstractA biparametric family of four-step multipoint iterative methods of order sixteen to solve no...
A family of derivative-free methods of seventh-order convergence for solving nonlinear equations is ...
This work proposes new fourth-order iterative methods to solve non-linear equations . The ite...
A new inverse family of the iterative method is interrogated in the present article for simultaneous...
[EN] We present new high-order optimal iterativemethods for solving a nonlinear equation, f(x) = 0, ...
Kung-Traub conjecture states that an iterative method without memory for finding the simple zero of ...
[EN] There is a very small number of higher-order iteration functions for multiple zeros whose order...
A class of optimal iterative methods for solving nonlinear equations is extended up to sixteenth-ord...
AbstractA biparametric family of four-step multipoint iterative methods of order sixteen to numerica...
[EN] The main contribution of this study is to present a new optimal eighth-order scheme for locatin...
In this paper, we present a family of optimal, in the sense of Kung-Traub's conjecture, iterative me...
[EN] In the recent literature, very few high-order Jacobian-free methods with memory for solving non...
[EN] There is a few number of optimal fourth-order iterative methods for obtaining the multiple root...
[EN] The aim of this paper is to introduce new high order iterative methods for multiple roots of th...
In this manuscript, a new parametric class of iterative methods for solving nonlinear systems of equ...
AbstractA biparametric family of four-step multipoint iterative methods of order sixteen to solve no...
A family of derivative-free methods of seventh-order convergence for solving nonlinear equations is ...
This work proposes new fourth-order iterative methods to solve non-linear equations . The ite...
A new inverse family of the iterative method is interrogated in the present article for simultaneous...
[EN] We present new high-order optimal iterativemethods for solving a nonlinear equation, f(x) = 0, ...
Kung-Traub conjecture states that an iterative method without memory for finding the simple zero of ...
[EN] There is a very small number of higher-order iteration functions for multiple zeros whose order...