AbstractNewton's method is well-known to be generally convergent for solving xn-c=0. In this paper, we first extend this result to the next two members of an infinite family of high order methods referred to here as the Basic Family which starts with Newton's method. While computing roots of unity numerically is a trivial task, studying the general convergence of the Basic Family in this simple case is an important first step toward the understanding of the global behavior of this fundamental family. With the aid of polynomiography, techniques for the visualization of polynomial root-finding, we further conjecture the general convergence of all members of the Basic Family when extracting radicals. Using the computer algebra system Maple, we...
An iterative method is described which finds all the roots of a square-free polynomial at once, usin...
We investigate Newton's method for complex polynomials of arbitrary degree d, normalized so that all...
We study the relaxed Newton's method applied to polynomials. In particular, we give a technique such...
Using a result from orbifold theory, McMullen showed that Newton’s method is generally convergent fo...
AbstractNewton's method is well-known to be generally convergent for solving xn-c=0. In this paper, ...
AbstractWe study the dynamics of a higher-order family of iterative methods for solving non-linear e...
We study the dynamics of a higher-order family of iterative methods for solving non-linear equations...
We introduce a class of new iteration functions which are ratios of polynomials of the same degree a...
A construct is developed which is useful in the investigation of the global convergence properties o...
AbstractSchröder’s methods of the first and second kind for solving a nonlinear equation f(x)=0, ori...
It is well-known that Halley's method can be obtained by applying Newton's method to the f...
AbstractFor each natural number m greater than one, and each natural number k less than or equal to ...
For each natural number m greater than one, and each natural number k less than or equal to m, there...
We introduce a new iterative root-finding method for complex polynomials, dubbed Newton-Ellipsoid me...
This paper is dedicated to the study of continuous Newton's method, which is a generic differential ...
An iterative method is described which finds all the roots of a square-free polynomial at once, usin...
We investigate Newton's method for complex polynomials of arbitrary degree d, normalized so that all...
We study the relaxed Newton's method applied to polynomials. In particular, we give a technique such...
Using a result from orbifold theory, McMullen showed that Newton’s method is generally convergent fo...
AbstractNewton's method is well-known to be generally convergent for solving xn-c=0. In this paper, ...
AbstractWe study the dynamics of a higher-order family of iterative methods for solving non-linear e...
We study the dynamics of a higher-order family of iterative methods for solving non-linear equations...
We introduce a class of new iteration functions which are ratios of polynomials of the same degree a...
A construct is developed which is useful in the investigation of the global convergence properties o...
AbstractSchröder’s methods of the first and second kind for solving a nonlinear equation f(x)=0, ori...
It is well-known that Halley's method can be obtained by applying Newton's method to the f...
AbstractFor each natural number m greater than one, and each natural number k less than or equal to ...
For each natural number m greater than one, and each natural number k less than or equal to m, there...
We introduce a new iterative root-finding method for complex polynomials, dubbed Newton-Ellipsoid me...
This paper is dedicated to the study of continuous Newton's method, which is a generic differential ...
An iterative method is described which finds all the roots of a square-free polynomial at once, usin...
We investigate Newton's method for complex polynomials of arbitrary degree d, normalized so that all...
We study the relaxed Newton's method applied to polynomials. In particular, we give a technique such...