Abstract. A classical model of Newton iterations which takes into account some error terms is given by the quasi-Newton method, which assumes perturbed Jacobians at each step. Its high convergence orders were characterized by Dennis and Moré [Math. Comp. 28 (1974), 549–560]. The inexact Newton method constitutes another such model, since it assumes that at each step the linear systems are only approximately solved; the high convergence orders of these iterations were characterized by Dembo, Eisenstat and Steihaug [SIAM J. Numer. Anal. 19 (1982), 400–408]. We have recently considered the inexact perturbed Newton method [J. Optim. Theory Appl. 108 (2001), 543–570] which assumes that at each step the linear systems are perturbed and then they ...
4In this paper preconditioners for solving the linear systems of the Newton method in each nonlinear...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
We study the convergence properties for some inexact Newton-like methods including the inexact Newto...
The inexact Newton method is widely used to solve systems of non-linear equations. It is well-known ...
Abstract. Inexact Newton methods for finding a zero of F 1 1 are variations of Newton’s method in wh...
Abstract A solid understanding of convergence behaviour is essential to the design and analysis of i...
This paper highlights the important theoretical developments in the study of quasi-Newton or update...
AbstractWe review the most important theoretical results on Newton's method concerning the convergen...
AbstractWe introduce the new idea of recurrent functions to provide a semilocal convergence analysis...
Inexact Newton regularization methods have been proposed by Hanke and Rieder for solving nonlinear i...
The inexact quasi-Newton methods are very attractive methods for large scale optimization since they...
AbstractThe present paper is concerned with the convergence problem of inexact Newton methods. Assum...
We analyze the convergence of quasi-Newton methods in exact and finite precision arithmetic using th...
Inexact Newton methods for solving F (x) = 0, F: D ∈ IRn → IRn with F ∈ CI1(D), where D is an open ...
AbstractWe consider modifications of Newton's method for solving a nonlinear system F(x) = 0 where F...
4In this paper preconditioners for solving the linear systems of the Newton method in each nonlinear...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
We study the convergence properties for some inexact Newton-like methods including the inexact Newto...
The inexact Newton method is widely used to solve systems of non-linear equations. It is well-known ...
Abstract. Inexact Newton methods for finding a zero of F 1 1 are variations of Newton’s method in wh...
Abstract A solid understanding of convergence behaviour is essential to the design and analysis of i...
This paper highlights the important theoretical developments in the study of quasi-Newton or update...
AbstractWe review the most important theoretical results on Newton's method concerning the convergen...
AbstractWe introduce the new idea of recurrent functions to provide a semilocal convergence analysis...
Inexact Newton regularization methods have been proposed by Hanke and Rieder for solving nonlinear i...
The inexact quasi-Newton methods are very attractive methods for large scale optimization since they...
AbstractThe present paper is concerned with the convergence problem of inexact Newton methods. Assum...
We analyze the convergence of quasi-Newton methods in exact and finite precision arithmetic using th...
Inexact Newton methods for solving F (x) = 0, F: D ∈ IRn → IRn with F ∈ CI1(D), where D is an open ...
AbstractWe consider modifications of Newton's method for solving a nonlinear system F(x) = 0 where F...
4In this paper preconditioners for solving the linear systems of the Newton method in each nonlinear...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
We study the convergence properties for some inexact Newton-like methods including the inexact Newto...