AbstractRecently, there has been some progress on Newton-type methods with cubic convergence that do not require the computation of second derivatives. Weerakoon and Fernando (Appl. Math. Lett. 13 (2000) 87) derived the Newton method and a cubically convergent variant by rectangular and trapezoidal approximations to Newton's theorem, while Frontini and Sormani (J. Comput. Appl. Math. 156 (2003) 345; 140 (2003) 419 derived further cubically convergent variants by using different approximations to Newton's theorem. Homeier (J. Comput. Appl. Math. 157 (2003) 227; 169 (2004) 161) independently derived one of the latter variants and extended it to the multivariate case. Here, we show that one can modify the Werrakoon–Fernando approach by using N...
AbstractIn this work, a class of iterative Newton’s methods, known as power mean Newton’s methods, i...
AbstractA simple modification to the standard Newton method for approximating the root of a univaria...
Stirling's method is considered as an alternative to Newton's method when the latter fails to conver...
AbstractRecently, a modification of the Newton method for finding a zero of a univariate function wi...
AbstractWe introduce two families of Newton-type methods for multiple roots with cubic convergence. ...
AbstractIn this paper, we discuss two variants of Newton's method without using any second derivativ...
AbstractIn this paper, we present a new modification of Newton's method for solving non-linear equat...
For the last years, the variants of the Newton-s method with cubic convergence have become popular i...
We consider a modification of the Newton method for finding a zero of a univariate function. The cas...
AbstractWe consider a modification of the Newton method for finding a zero of a univariate function....
AbstractThe paper presents a convergence analysis of a modified Newton method for solving nonlinear ...
AbstractUnder weak conditions, we present an iteration formula to improve Newton's method for solvin...
In this paper, we propose a third-order Newton's method which in each iteration solves a semidefinit...
The current manuscript is concerned with the development of the Newton–Raphson method, playing a sig...
AbstractLet f:C→C have a multiple zero α with integer multiplicity m≥1 and be analytic in a sufficie...
AbstractIn this work, a class of iterative Newton’s methods, known as power mean Newton’s methods, i...
AbstractA simple modification to the standard Newton method for approximating the root of a univaria...
Stirling's method is considered as an alternative to Newton's method when the latter fails to conver...
AbstractRecently, a modification of the Newton method for finding a zero of a univariate function wi...
AbstractWe introduce two families of Newton-type methods for multiple roots with cubic convergence. ...
AbstractIn this paper, we discuss two variants of Newton's method without using any second derivativ...
AbstractIn this paper, we present a new modification of Newton's method for solving non-linear equat...
For the last years, the variants of the Newton-s method with cubic convergence have become popular i...
We consider a modification of the Newton method for finding a zero of a univariate function. The cas...
AbstractWe consider a modification of the Newton method for finding a zero of a univariate function....
AbstractThe paper presents a convergence analysis of a modified Newton method for solving nonlinear ...
AbstractUnder weak conditions, we present an iteration formula to improve Newton's method for solvin...
In this paper, we propose a third-order Newton's method which in each iteration solves a semidefinit...
The current manuscript is concerned with the development of the Newton–Raphson method, playing a sig...
AbstractLet f:C→C have a multiple zero α with integer multiplicity m≥1 and be analytic in a sufficie...
AbstractIn this work, a class of iterative Newton’s methods, known as power mean Newton’s methods, i...
AbstractA simple modification to the standard Newton method for approximating the root of a univaria...
Stirling's method is considered as an alternative to Newton's method when the latter fails to conver...