[EN] Finding a repeated zero for a nonlinear equation f(x) = 0, f : I subset of R -> R has always been of much interest and attention due to its wide applications in many fields of science and engineering. Modified Newton's method is usually applied to solve this kind of problems. Keeping in view that very few optimal higher-order convergent methods exist for multiple roots, we present a new family of optimal eighth-order convergent iterative methods for multiple roots with known multiplicity involving a multivariate weight function. The numerical performance of the proposed methods is analyzed extensively along with the basins of attractions. Real life models from life science, engineering, and physics are considered for the sake of compar...
The objective of this manuscript is to introduce a new family of optimal eight-order iterative metho...
AbstractIn this paper, three new families of eighth-order iterative methods for solving simple roots...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
Finding a repeated zero for a nonlinear equation f ( x ) = 0 , f : I ⊆ R → R ...
[EN] In this paper, we propose a family of iterative methods for finding multiple roots, with known ...
[EN] There is a very small number of higher-order iteration functions for multiple zeros whose order...
This paper deals with the problem of determining the multiple roots of nonlinear equations, where th...
There are a few optimal eighth order methods in literature for computing multiple zeros of a nonlin...
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...
[EN] There are few optimal fourth-order methods for solving nonlinear equations when the multiplicit...
Recently, some optimal fourth-order iterative methods for multiple roots of nonlinear equations...
An optimal family of eighth-order multiple-zero finders and the dynamics behind their basins of attr...
AbstractIn this paper, we present two new families of iterative methods for multiple roots of nonlin...
In this manuscript, we present a new general family of optimal iterative methods for finding multipl...
The objective of this manuscript is to introduce a new family of optimal eight-order iterative metho...
AbstractIn this paper, three new families of eighth-order iterative methods for solving simple roots...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
Finding a repeated zero for a nonlinear equation f ( x ) = 0 , f : I ⊆ R → R ...
[EN] In this paper, we propose a family of iterative methods for finding multiple roots, with known ...
[EN] There is a very small number of higher-order iteration functions for multiple zeros whose order...
This paper deals with the problem of determining the multiple roots of nonlinear equations, where th...
There are a few optimal eighth order methods in literature for computing multiple zeros of a nonlin...
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...
[EN] There are few optimal fourth-order methods for solving nonlinear equations when the multiplicit...
Recently, some optimal fourth-order iterative methods for multiple roots of nonlinear equations...
An optimal family of eighth-order multiple-zero finders and the dynamics behind their basins of attr...
AbstractIn this paper, we present two new families of iterative methods for multiple roots of nonlin...
In this manuscript, we present a new general family of optimal iterative methods for finding multipl...
The objective of this manuscript is to introduce a new family of optimal eight-order iterative metho...
AbstractIn this paper, three new families of eighth-order iterative methods for solving simple roots...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...