The a posteriori estimate of the errors in the numerical solution of ill-conditioned linear systems with contaminated data is a complicated problem. Several estimates of the norm of the error have been recently introduced and analyzed, under the assumption that the matrix is square and nonsingular. In this paper we study the same problem in the case of a rectangular and, in general, rank-deficient matrix. As a result, a class of error estimates previously introduced by the authors (Brezinski et al., Numer Algorithms, in press, 2008) are extended to the least squares solution of consistent and inconsistent linear systems. Their application to various direct and iterative regularization methods are also discussed, and the numerical effectiven...
. Discretizations of inverse problems lead to systems of linear equations with a highly ill-conditio...
An optimization problem that does not have an unique local minimum is often very difficult to solve....
The results of a numerical investigation into the errors for least squares estimates of function gra...
In this paper, we discuss several (old and new) estimates for the norm of the error in the solution ...
Abstract. Straightforward solution of discrete ill-posed linear systems of equations or least-square...
The straightforward solution of discrete ill-posed linear systems of equations or least-squares prob...
In this work we study the least squares and the total least squares problem for the solution of line...
The computation of an approximate solution of linear discrete illposed problems with contaminated da...
In this thesis we consider error estimates for a family of iterative algorithms for solving the leas...
In this note, we analyze the influence of the regularization procedure applied to singular LS square...
. A nonlinear least squares problem is almost rank deficient at a local minimum if there is a large ...
AbstractStraightforward solution of discrete ill-posed least-squares problems with error-contaminate...
Straightforward solution of discrete ill-posed least-squares problems with error-contaminated data d...
In two papers, we develop theory and methods for regularization of nonlinear least squares problems ...
The advent of the computer had forced the application of mathematics to all branches of human endeav...
. Discretizations of inverse problems lead to systems of linear equations with a highly ill-conditio...
An optimization problem that does not have an unique local minimum is often very difficult to solve....
The results of a numerical investigation into the errors for least squares estimates of function gra...
In this paper, we discuss several (old and new) estimates for the norm of the error in the solution ...
Abstract. Straightforward solution of discrete ill-posed linear systems of equations or least-square...
The straightforward solution of discrete ill-posed linear systems of equations or least-squares prob...
In this work we study the least squares and the total least squares problem for the solution of line...
The computation of an approximate solution of linear discrete illposed problems with contaminated da...
In this thesis we consider error estimates for a family of iterative algorithms for solving the leas...
In this note, we analyze the influence of the regularization procedure applied to singular LS square...
. A nonlinear least squares problem is almost rank deficient at a local minimum if there is a large ...
AbstractStraightforward solution of discrete ill-posed least-squares problems with error-contaminate...
Straightforward solution of discrete ill-posed least-squares problems with error-contaminated data d...
In two papers, we develop theory and methods for regularization of nonlinear least squares problems ...
The advent of the computer had forced the application of mathematics to all branches of human endeav...
. Discretizations of inverse problems lead to systems of linear equations with a highly ill-conditio...
An optimization problem that does not have an unique local minimum is often very difficult to solve....
The results of a numerical investigation into the errors for least squares estimates of function gra...