We survey influential quantitative results on the convergence of the Newton iterator towards simple roots of continuously differentiable maps defined over Banach spaces. We present a general statement of Kantorovich's theorem, with a concise proof from scratch, dedicated to wide audience. From it, we quickly recover known results, and gather historical notes together with pointers to recent articles
The classical Kantorovich theorem on Newton's method assumes that the first derivative of the operat...
AbstractWe introduce new semilocal convergence theorems for Newton-like methods in a Banach space se...
This book shows the importance of studying semilocal convergence in iterative methods through Newton...
We survey influential quantitative results on the convergence of the Newton iterator towards simple ...
AbstractIn this paper, a new theorem for the Newton method convergence is obtained. Its condition is...
AbstractThe famous Newton–Kantorovich hypothesis has been used for a long time as a sufficient condi...
We study the problem of finding good starting points for the semilocal convergence of Newton's metho...
AbstractWe revisit a fast iterative method studied by us in [I.K. Argyros, On a two-point Newton-lik...
AbstractThe classical Kantorovich theorem on Newton's method assumes that the first derivative of th...
Abstract. We present new semilocal convergence theorems for New-ton methods in a Banach space. Using...
AbstractIn the classical Kantorovich theorem on Newton's method it is assumed that the second Fréche...
We provide new semilocal results for Newton's method on Banach spaces with a convergence structure. ...
AbstractThe famous Newton–Kantorovich hypothesis has been used for a long time as a sufficient condi...
In Newton's method $0 \in f(x_k) + G(x_k) (x_{k+1} - x_k)$ for solving a nonsmooth equation $f(x) = ...
A new Kantorovich-type convergence theorem for Newton's method is established for approximating a lo...
The classical Kantorovich theorem on Newton's method assumes that the first derivative of the operat...
AbstractWe introduce new semilocal convergence theorems for Newton-like methods in a Banach space se...
This book shows the importance of studying semilocal convergence in iterative methods through Newton...
We survey influential quantitative results on the convergence of the Newton iterator towards simple ...
AbstractIn this paper, a new theorem for the Newton method convergence is obtained. Its condition is...
AbstractThe famous Newton–Kantorovich hypothesis has been used for a long time as a sufficient condi...
We study the problem of finding good starting points for the semilocal convergence of Newton's metho...
AbstractWe revisit a fast iterative method studied by us in [I.K. Argyros, On a two-point Newton-lik...
AbstractThe classical Kantorovich theorem on Newton's method assumes that the first derivative of th...
Abstract. We present new semilocal convergence theorems for New-ton methods in a Banach space. Using...
AbstractIn the classical Kantorovich theorem on Newton's method it is assumed that the second Fréche...
We provide new semilocal results for Newton's method on Banach spaces with a convergence structure. ...
AbstractThe famous Newton–Kantorovich hypothesis has been used for a long time as a sufficient condi...
In Newton's method $0 \in f(x_k) + G(x_k) (x_{k+1} - x_k)$ for solving a nonsmooth equation $f(x) = ...
A new Kantorovich-type convergence theorem for Newton's method is established for approximating a lo...
The classical Kantorovich theorem on Newton's method assumes that the first derivative of the operat...
AbstractWe introduce new semilocal convergence theorems for Newton-like methods in a Banach space se...
This book shows the importance of studying semilocal convergence in iterative methods through Newton...