In this paper, a family of Ostrowski-type iterative schemes with a biparameter was analyzed. We present the dynamic view of the proposed method and study various conjugation properties. The stability of the strange fixed points for special parameter values is studied. The parameter spaces related to the critical points and dynamic planes are used to visualize their dynamic properties. Eventually, we find the most stable member of the biparametric family of six-order Ostrowski-type methods. Some test equations are examined for supporting the theoretical results
In this paper, we study the dynamics of an iterative method based on the Ermakov-Kalitkin class of i...
We construct a new biparametric three-point method with memory to highly improve the computational e...
This is an Author's Accepted Manuscript of an article published in José L. Hueso, Eulalia Martínez ...
[EN] In this paper we present a dynamical study of the Ostrowski-Chun family of iterative methods on...
The dynamics of a biparametric family for solving nonlinear equations is studied on quadratic polyno...
The dynamics of a biparametric family for solving nonlinear equations is studied on quadratic polyno...
In this paper, we classify the fixed and critical points of the bi-parametric family o...
Many variants of existing multipoint methods have been developed. Recently, Khratti et al. (2011) d...
A generic family of sixth-order modified Newton-like multiple-zero finders have been proposed in Geu...
A one-parametric family of fourth-order iterative methods for solving nonlinear systems is presented...
In this paper, a complex dynamical study of a parametric Chebyshev–Halley type family of iterative m...
A triparametric family of fourth-order multiple-zero solvers have been proposed. In this paper, we s...
A bi-parametric family of iterative schemes for solving nonlinear systems is presented. We prove for...
[EN] In this manuscript, we analyze the dynamical anomalies of a parametric family of iterative sche...
A biparametric family of derivative-free optimal iterative methods of order four, for solving nonlin...
In this paper, we study the dynamics of an iterative method based on the Ermakov-Kalitkin class of i...
We construct a new biparametric three-point method with memory to highly improve the computational e...
This is an Author's Accepted Manuscript of an article published in José L. Hueso, Eulalia Martínez ...
[EN] In this paper we present a dynamical study of the Ostrowski-Chun family of iterative methods on...
The dynamics of a biparametric family for solving nonlinear equations is studied on quadratic polyno...
The dynamics of a biparametric family for solving nonlinear equations is studied on quadratic polyno...
In this paper, we classify the fixed and critical points of the bi-parametric family o...
Many variants of existing multipoint methods have been developed. Recently, Khratti et al. (2011) d...
A generic family of sixth-order modified Newton-like multiple-zero finders have been proposed in Geu...
A one-parametric family of fourth-order iterative methods for solving nonlinear systems is presented...
In this paper, a complex dynamical study of a parametric Chebyshev–Halley type family of iterative m...
A triparametric family of fourth-order multiple-zero solvers have been proposed. In this paper, we s...
A bi-parametric family of iterative schemes for solving nonlinear systems is presented. We prove for...
[EN] In this manuscript, we analyze the dynamical anomalies of a parametric family of iterative sche...
A biparametric family of derivative-free optimal iterative methods of order four, for solving nonlin...
In this paper, we study the dynamics of an iterative method based on the Ermakov-Kalitkin class of i...
We construct a new biparametric three-point method with memory to highly improve the computational e...
This is an Author's Accepted Manuscript of an article published in José L. Hueso, Eulalia Martínez ...