This paper deals with the problem of determining the multiple roots of nonlinear equations, where the multiplicity of the roots is known. The paper contains some remarks on the optimality of the recently published methods [B. Liu, X. Zhou, A new family of fourth-order methods for multiple roots of nonlinear equations, Nonlinear Anal. Model. Control, 18(2):143–152, 2013] and [X. Zhou, X. Chen, Y. Song, Families of third- and fourth-order methods for multiple roots of nonlinear equations, Appl. Math. Comput., 219(11):6030–6038, 2013]. Separate analysis of odd and even multiplicity, has shown the cases where those methods lose their optimal convergence properties. Numerical experiments are made and they support theoretical analysis
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
In this paper we present three new methods of order four using anaccelerating generator that generat...
AbstractA method of order four for finding multiple zeros of nonlinear functions is developed. The m...
Recently, some optimal fourth-order iterative methods for multiple roots of nonlinear equations...
[EN] There are few optimal fourth-order methods for solving nonlinear equations when the multiplicit...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
In this paper, we present optimal fourth-order methods for finding multiple roots of non-linear equa...
[EN] Finding a repeated zero for a nonlinear equation f(x) = 0, f : I subset of R -> R has always be...
[EN] In this paper, we propose a family of iterative methods for finding multiple roots, with known ...
[EN] The use of complex dynamics tools in order to deepen the knowledge of qualitative behaviour of ...
AbstractIn this paper, we present two new families of iterative methods for multiple roots of nonlin...
In the literature, recently, some three-step schemes involving four function evaluations for the sol...
The final publication is available at Springer via https://dx.doi.org/10.1007/s10910-014-0460-8[EN] ...
Finding multiple zeros of nonlinear functions pose many difficulties for many of the iterative metho...
This study presents a new efficient family of eighth order methods for finding the simple root of no...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
In this paper we present three new methods of order four using anaccelerating generator that generat...
AbstractA method of order four for finding multiple zeros of nonlinear functions is developed. The m...
Recently, some optimal fourth-order iterative methods for multiple roots of nonlinear equations...
[EN] There are few optimal fourth-order methods for solving nonlinear equations when the multiplicit...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
In this paper, we present optimal fourth-order methods for finding multiple roots of non-linear equa...
[EN] Finding a repeated zero for a nonlinear equation f(x) = 0, f : I subset of R -> R has always be...
[EN] In this paper, we propose a family of iterative methods for finding multiple roots, with known ...
[EN] The use of complex dynamics tools in order to deepen the knowledge of qualitative behaviour of ...
AbstractIn this paper, we present two new families of iterative methods for multiple roots of nonlin...
In the literature, recently, some three-step schemes involving four function evaluations for the sol...
The final publication is available at Springer via https://dx.doi.org/10.1007/s10910-014-0460-8[EN] ...
Finding multiple zeros of nonlinear functions pose many difficulties for many of the iterative metho...
This study presents a new efficient family of eighth order methods for finding the simple root of no...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
In this paper we present three new methods of order four using anaccelerating generator that generat...
AbstractA method of order four for finding multiple zeros of nonlinear functions is developed. The m...