The minimization of a quadratic function within an ellipsoidal trust region is an important subproblem for many nonlinear programming algorithms. When the number of variables is large, one of the most widely used strategies is to project the original problem into a small dimensional subspace. In this paper, we introduce an algorithm for solving nonlinear least squares problems. This algorithm is based on constructing a basis for the Krylov subspace in conjunction with a model trust region technique to choose the step. The computational step on the small dimensional subspace lies inside the trust region. The Krylov subspace is terminated such that the termination condition allows the gradient to be decreased on it. A convergence theory of th...
AbstractAn algorithm for computing solutions of overdetermined systems of linear equations in n real...
This paper extends prior work by the authors on solving nonlinear least squares unconstrained proble...
A more fundamental concept than the minimal residual method is proposed in this paper to solve an n-...
The minimization of a quadratic function within an ellipsoidal trust region is an important subprobl...
We propose a modification of an algorithm introduced by Martínez (1987) for solving nonlinear least-...
AbstractThis paper presents a new method with trust region technique for solving the nonlinear least...
We introduce an inexact Gauss–Newton trust-region method for solving bound-constrained nonlinear lea...
In this work an iterative method to solve the nonlinear least squares problem is presented. The algo...
We propose an iterative method that solves constrained linear least-squares problems by formulating ...
In this paper, we consider the problem of solving nonlinear equations F (x) = 0, where F (x) from ! ...
Some convergence theory is presented for nonlinear Krylov subspace methods. The basic idea of these ...
Abstract. The Matlab implementation of a trust-region Gauss-Newton method for bound-constrained nonl...
This thesis extends the design and the global convergence analysis of a class of trust-region sequen...
Abstract. We propose an iterative method that solves constrained linear least-squares problems by fo...
We consider a class of non-linear least squares problems that are widely used in fitting experimenta...
AbstractAn algorithm for computing solutions of overdetermined systems of linear equations in n real...
This paper extends prior work by the authors on solving nonlinear least squares unconstrained proble...
A more fundamental concept than the minimal residual method is proposed in this paper to solve an n-...
The minimization of a quadratic function within an ellipsoidal trust region is an important subprobl...
We propose a modification of an algorithm introduced by Martínez (1987) for solving nonlinear least-...
AbstractThis paper presents a new method with trust region technique for solving the nonlinear least...
We introduce an inexact Gauss–Newton trust-region method for solving bound-constrained nonlinear lea...
In this work an iterative method to solve the nonlinear least squares problem is presented. The algo...
We propose an iterative method that solves constrained linear least-squares problems by formulating ...
In this paper, we consider the problem of solving nonlinear equations F (x) = 0, where F (x) from ! ...
Some convergence theory is presented for nonlinear Krylov subspace methods. The basic idea of these ...
Abstract. The Matlab implementation of a trust-region Gauss-Newton method for bound-constrained nonl...
This thesis extends the design and the global convergence analysis of a class of trust-region sequen...
Abstract. We propose an iterative method that solves constrained linear least-squares problems by fo...
We consider a class of non-linear least squares problems that are widely used in fitting experimenta...
AbstractAn algorithm for computing solutions of overdetermined systems of linear equations in n real...
This paper extends prior work by the authors on solving nonlinear least squares unconstrained proble...
A more fundamental concept than the minimal residual method is proposed in this paper to solve an n-...