In this paper, we show that the main results of the local convergence theory for least-change secant update methods of Dennis and Walker (SIAM J. Numer. Anal. 18 (1981), 949-987) can be proved using the theory introduced recently by Martinez (Math. Comp. 55 (1990), 143-167). In addition, we exhibit two generalizations of well-known methods whose local convergence can be easily proved using Martinez's theory.5920045748
We develop a theory of quasi-Newton and least-change update methods for solving systems of nonlinear...
We present two new semilocal convergence analyses for secant-like methods in order to approximate a ...
Least change secant updates can be obtained as the limit of iterated projections based on other seca...
Abstract. The purpose of this paper is to present a convergence analysis of least change secant meth...
The purpose of this paper is to present a convergence analysis of the least change secant methods i...
We extend the local convergence theory of least change secant update methods given by Martinez (Math...
Least-change secant updates for nonsquare matrices have been addressed recently in [6]. Here we con...
Abstract. Least-change secant updates for nonsquare matrices have been addressed recently in [6]. He...
The inverse Column-Updating method is a secant algorithm for solving nonlinear systems of equations ...
A family of Least-Change Secant-Update methods for solving nonlinear complementarity problems based ...
In this paper, we investigate the role of the secant or quasi-Newton condition in the sparse Broyden...
A theory of inexact Newton methods with secant preconditioners for solving large nonlinear systems o...
Abstract. The notion of least-change secant updates is extended to apply to nonsquare matrices in a ...
Abstract. We investigate the role of the secant or quasi-Newton condition in the sparse Broyden or S...
In many problems involving the solution of a system of non-linear equations, it is necessary to keep...
We develop a theory of quasi-Newton and least-change update methods for solving systems of nonlinear...
We present two new semilocal convergence analyses for secant-like methods in order to approximate a ...
Least change secant updates can be obtained as the limit of iterated projections based on other seca...
Abstract. The purpose of this paper is to present a convergence analysis of least change secant meth...
The purpose of this paper is to present a convergence analysis of the least change secant methods i...
We extend the local convergence theory of least change secant update methods given by Martinez (Math...
Least-change secant updates for nonsquare matrices have been addressed recently in [6]. Here we con...
Abstract. Least-change secant updates for nonsquare matrices have been addressed recently in [6]. He...
The inverse Column-Updating method is a secant algorithm for solving nonlinear systems of equations ...
A family of Least-Change Secant-Update methods for solving nonlinear complementarity problems based ...
In this paper, we investigate the role of the secant or quasi-Newton condition in the sparse Broyden...
A theory of inexact Newton methods with secant preconditioners for solving large nonlinear systems o...
Abstract. The notion of least-change secant updates is extended to apply to nonsquare matrices in a ...
Abstract. We investigate the role of the secant or quasi-Newton condition in the sparse Broyden or S...
In many problems involving the solution of a system of non-linear equations, it is necessary to keep...
We develop a theory of quasi-Newton and least-change update methods for solving systems of nonlinear...
We present two new semilocal convergence analyses for secant-like methods in order to approximate a ...
Least change secant updates can be obtained as the limit of iterated projections based on other seca...