[EN] The aim of this paper is to introduce new high order iterative methods for multiple roots of the nonlinear scalar equation; this is a demanding task in the area of computational mathematics and numerical analysis. Specifically, we present a new Chebyshev¿Halley-type iteration function having at least sixth-order convergence and eighth-order convergence for a particular value in the case of multiple roots. With regard to computational cost, each member of our scheme needs four functional evaluations each step. Therefore, the maximum efficiency index of our scheme is 1.6818 for ¿ = 2,which corresponds to an optimal method in the sense of Kung and Traub¿s conjecture. We obtain the theoretical convergence order by using Taylor developments...
[EN] In this paper, we have constructed a derivative¿free weighted eighth¿order iterative method ...
AbstractA biparametric family of four-step multipoint iterative methods of order sixteen to numerica...
The dynamical behavior of different Steffensen-type methods is analyzed. We check the chaotic behavi...
[EN] There is a few number of optimal fourth-order iterative methods for obtaining the multiple root...
[EN] The main contribution of this study is to present a new optimal eighth-order scheme for locatin...
[EN] In the recent literature, very few high-order Jacobian-free methods with memory for solving non...
In this manuscript, a new parametric class of iterative methods for solving nonlinear systems of equ...
A class of optimal iterative methods for solving nonlinear equations is extended up to sixteenth-ord...
In this paper, we present a family of optimal, in the sense of Kung-Traub's conjecture, iterative me...
[EN] In this paper, the convergence and dynamics of improved Chebyshev-Secant-type iterative methods...
[EN] We present new high-order optimal iterativemethods for solving a nonlinear equation, f(x) = 0, ...
[EN] In this paper, a family of parametric iterative methods for solving nonlinear equations, includ...
[EN] There is a very small number of higher-order iteration functions for multiple zeros whose order...
A family of derivative-free methods of seventh-order convergence for solving nonlinear equations is ...
A new inverse family of the iterative method is interrogated in the present article for simultaneous...
[EN] In this paper, we have constructed a derivative¿free weighted eighth¿order iterative method ...
AbstractA biparametric family of four-step multipoint iterative methods of order sixteen to numerica...
The dynamical behavior of different Steffensen-type methods is analyzed. We check the chaotic behavi...
[EN] There is a few number of optimal fourth-order iterative methods for obtaining the multiple root...
[EN] The main contribution of this study is to present a new optimal eighth-order scheme for locatin...
[EN] In the recent literature, very few high-order Jacobian-free methods with memory for solving non...
In this manuscript, a new parametric class of iterative methods for solving nonlinear systems of equ...
A class of optimal iterative methods for solving nonlinear equations is extended up to sixteenth-ord...
In this paper, we present a family of optimal, in the sense of Kung-Traub's conjecture, iterative me...
[EN] In this paper, the convergence and dynamics of improved Chebyshev-Secant-type iterative methods...
[EN] We present new high-order optimal iterativemethods for solving a nonlinear equation, f(x) = 0, ...
[EN] In this paper, a family of parametric iterative methods for solving nonlinear equations, includ...
[EN] There is a very small number of higher-order iteration functions for multiple zeros whose order...
A family of derivative-free methods of seventh-order convergence for solving nonlinear equations is ...
A new inverse family of the iterative method is interrogated in the present article for simultaneous...
[EN] In this paper, we have constructed a derivative¿free weighted eighth¿order iterative method ...
AbstractA biparametric family of four-step multipoint iterative methods of order sixteen to numerica...
The dynamical behavior of different Steffensen-type methods is analyzed. We check the chaotic behavi...