Least-change secant updates for nonsquare matrices have been addressed recently in [6]. Here we consider the use of these updates in iterative procedures for the numerical solution of underdetermined systems. Our model method is the normal flow algorithm used in homotopy or continuation methods for determining points on an implicitly defined curve. A Kantorovich-type local convergence analysis is given which supports the use of least-change secant updates in this algorithm. This analysis also provides a Kantorovich-type local convergence analysis for least-change secant update methods in the usual case of an equal number of equations and unknowns. This in turn gives a local convergence analysis for augmented Jacobian algorithms which use l...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
A new family of least-change weak-secant methods for solving systems of nonlinear algebraic equatio...
A theory of inexact Newton methods with secant preconditioners for solving large nonlinear systems o...
Abstract. Least-change secant updates for nonsquare matrices have been addressed recently in [6]. He...
Abstract. The notion of least-change secant updates is extended to apply to nonsquare matrices in a ...
In many problems involving the solution of a system of nonlinear equations, it is necessary to keep ...
In this paper, we investigate the role of the secant or quasi-Newton condition in the sparse Broyden...
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...
Abstract. The purpose of this paper is to present a convergence analysis of least change secant meth...
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...
In many problems involving the solution of a system of nonlinear equations, it is necessary to keep...
The inverse Column-Updating method is a secant algorithm for solving nonlinear systems of equations ...
In this paper, we show that the main results of the local convergence theory for least-change secant...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
A new family of least-change weak-secant methods for solving systems of nonlinear algebraic equatio...
A theory of inexact Newton methods with secant preconditioners for solving large nonlinear systems o...
Abstract. Least-change secant updates for nonsquare matrices have been addressed recently in [6]. He...
Abstract. The notion of least-change secant updates is extended to apply to nonsquare matrices in a ...
In many problems involving the solution of a system of nonlinear equations, it is necessary to keep ...
In this paper, we investigate the role of the secant or quasi-Newton condition in the sparse Broyden...
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...
Abstract. The purpose of this paper is to present a convergence analysis of least change secant meth...
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...
In many problems involving the solution of a system of nonlinear equations, it is necessary to keep...
The inverse Column-Updating method is a secant algorithm for solving nonlinear systems of equations ...
In this paper, we show that the main results of the local convergence theory for least-change secant...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
A new family of least-change weak-secant methods for solving systems of nonlinear algebraic equatio...
A theory of inexact Newton methods with secant preconditioners for solving large nonlinear systems o...