Add to ORKGThe conventional Newton’s method for finding a zero of a function F: Rn → Rn, assuming that (F ′(y))−1 exists for at least some y in Rn, is the familiar iteration: pick z0 in R n and defin
Abstract. In this paper Newton’s method is derived, the general speed of convergence of the method i...
In this paper, we deal with the problem of solving systems of nonlinear equations. Most of the exist...
Fundamental insight into the solution of systems of nonlinear equations was provided by Powell. It w...
We prove an inverse function theorem of the Nash-Moser type. The main difference between our method ...
The main problem we are going to analyze is the computation of the zeroes of an application f ∈ Ck(R...
Here we report building a numerical method for finding the zeros of a function of one real variable ...
We prove an inverse function theorem of the Nash-Moser type. The main difference between our method ...
An infinitesimal version (Newton flow) of Newton’s iteration for finding zeros of rational functions...
This paper is dedicated to the study of continuous Newton's method, which is a generic differential ...
This paper is dedicated to the study of continuous Newton’s method, which is a generic differential ...
It is well-known that Halley’s method can be obtained by applying Newton’s method to the function f/...
Let f be a function f: R → R and ζ a root of f, that is, f(ζ) = 0. It is well known that if we take...
Abstract. Inexact Newton methods for finding a zero of F 1 1 are variations of Newton’s method in wh...
Mathematicians ’ obsession with counting led to many interesting and far-fetched problems. These lec...
SIGLETIB Hannover: RN 5999 (1980,11) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische I...
Abstract. In this paper Newton’s method is derived, the general speed of convergence of the method i...
In this paper, we deal with the problem of solving systems of nonlinear equations. Most of the exist...
Fundamental insight into the solution of systems of nonlinear equations was provided by Powell. It w...
We prove an inverse function theorem of the Nash-Moser type. The main difference between our method ...
The main problem we are going to analyze is the computation of the zeroes of an application f ∈ Ck(R...
Here we report building a numerical method for finding the zeros of a function of one real variable ...
We prove an inverse function theorem of the Nash-Moser type. The main difference between our method ...
An infinitesimal version (Newton flow) of Newton’s iteration for finding zeros of rational functions...
This paper is dedicated to the study of continuous Newton's method, which is a generic differential ...
This paper is dedicated to the study of continuous Newton’s method, which is a generic differential ...
It is well-known that Halley’s method can be obtained by applying Newton’s method to the function f/...
Let f be a function f: R → R and ζ a root of f, that is, f(ζ) = 0. It is well known that if we take...
Abstract. Inexact Newton methods for finding a zero of F 1 1 are variations of Newton’s method in wh...
Mathematicians ’ obsession with counting led to many interesting and far-fetched problems. These lec...
SIGLETIB Hannover: RN 5999 (1980,11) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische I...
Abstract. In this paper Newton’s method is derived, the general speed of convergence of the method i...
In this paper, we deal with the problem of solving systems of nonlinear equations. Most of the exist...
Fundamental insight into the solution of systems of nonlinear equations was provided by Powell. It w...