AbstractA method of order four for finding multiple zeros of nonlinear functions is developed. The method is based on Jarratt’s fifth-order method (for simple roots) and it requires one evaluation of the function and three evaluations of the derivative. The informational efficiency of the method is the same as previously developed schemes of lower order. For the special case of double root, we found a family of fourth-order methods requiring one less derivative. Thus this family is more efficient than all others. All these methods require the knowledge of the multiplicity
This paper presents a fifth-order iterative method as a new modification of Newton's method for...
[[abstract]]In this paper, we point out and analyse six two-step iterative methods for finding multi...
Finding a repeated zero for a nonlinear equation f ( x ) = 0 , f : I ⊆ R → R ...
The article of record as published may be found at http://dx.doi.org/10.1016/j.camwa.2007.09.001A me...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
AbstractIn this paper, a new family of third-order methods for finding multiple roots of nonlinear e...
In this paper we present three new methods of order four using an accelerating generator that genera...
A three-step iterative method with fifth-order convergence as a new modification of Newton’s method ...
This thesis discusses the problem of finding the multiple zeros of nonlinear equations. Six two-ste...
We present a new fourth order method for finding simple roots of a nonlinear equation f(x)=0. In ter...
AbstractTargeting a new multiple zero finder, in this paper, we suggest an efficient two-point class...
Targeting a new multiple zero finder, in this paper, we suggest an efficient two-point class of meth...
Copyright © 2013 Fazlollah Soleymani et al. This is an open access article distributed under the Cre...
This paper presents a fifth-order iterative method as a new modification of Newton's method for find...
This paper presents a fifth-order iterative method as a new modification of Newton's method for...
[[abstract]]In this paper, we point out and analyse six two-step iterative methods for finding multi...
Finding a repeated zero for a nonlinear equation f ( x ) = 0 , f : I ⊆ R → R ...
The article of record as published may be found at http://dx.doi.org/10.1016/j.camwa.2007.09.001A me...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
AbstractIn this paper, a new family of third-order methods for finding multiple roots of nonlinear e...
In this paper we present three new methods of order four using an accelerating generator that genera...
A three-step iterative method with fifth-order convergence as a new modification of Newton’s method ...
This thesis discusses the problem of finding the multiple zeros of nonlinear equations. Six two-ste...
We present a new fourth order method for finding simple roots of a nonlinear equation f(x)=0. In ter...
AbstractTargeting a new multiple zero finder, in this paper, we suggest an efficient two-point class...
Targeting a new multiple zero finder, in this paper, we suggest an efficient two-point class of meth...
Copyright © 2013 Fazlollah Soleymani et al. This is an open access article distributed under the Cre...
This paper presents a fifth-order iterative method as a new modification of Newton's method for find...
This paper presents a fifth-order iterative method as a new modification of Newton's method for...
[[abstract]]In this paper, we point out and analyse six two-step iterative methods for finding multi...
Finding a repeated zero for a nonlinear equation f ( x ) = 0 , f : I ⊆ R → R ...