This paper is concerned with the solution of underdetermined linear systems of equations with a very ill-conditioned matrix A, whose dimensions are so large to make solution by direct methods impractical or infeasible. Image reconstruction from projections often gives rise to such systems. In order to facilitate the computation of a meaningful approximate solution, we regularize the linear system, i.e., we replace it by a nearby system that is better conditioned. The amount of regularization is determined by a regularization parameter. Its optimal value is, in most applications, not known a priori. We present a new iterative method based on the Lanczos algorithm for determining a suitable value of the regularization parameter by the discrep...
When a system of linear equations is ill-conditioned, regularization techniques provide a quite usef...
The computation of an approximate solution of linear discrete illposed problems with contaminated da...
In this paper, we discuss several (old and new) estimates for the norm of the error in the solution ...
This paper is concerned with the solution of underdetermined linear systems of equations with a very...
AbstractThis paper is concerned with the solution of underdetermined linear systems of equations wit...
Many real applications give rise to the solution of underdetermined linear systems of equations with...
The advent of the computer had forced the application of mathematics to all branches of human endeav...
This paper discusses iterative methods for the solution of very large severely ill-conditioned linea...
AbstractIn the existing Lanczos algorithms for solving systems of linear equations,the estimate for ...
The technique we propose for solving ill-conditioned linear systems consists of two steps. First we ...
A new method to treat the inherent instability of Lanczos-type algorithms is introduced. It enables ...
AbstractIterative methods for the solution of linear systems of equations produce a sequence of appr...
There are numerous algorithms for the solution of systems of linear equations and eigenvalue problem...
Iterative methods for the solution of linear systems of equations produce a sequence of approximate ...
Image reconstruction from projections gives rise to large ill-conditioned linear systems of equation...
When a system of linear equations is ill-conditioned, regularization techniques provide a quite usef...
The computation of an approximate solution of linear discrete illposed problems with contaminated da...
In this paper, we discuss several (old and new) estimates for the norm of the error in the solution ...
This paper is concerned with the solution of underdetermined linear systems of equations with a very...
AbstractThis paper is concerned with the solution of underdetermined linear systems of equations wit...
Many real applications give rise to the solution of underdetermined linear systems of equations with...
The advent of the computer had forced the application of mathematics to all branches of human endeav...
This paper discusses iterative methods for the solution of very large severely ill-conditioned linea...
AbstractIn the existing Lanczos algorithms for solving systems of linear equations,the estimate for ...
The technique we propose for solving ill-conditioned linear systems consists of two steps. First we ...
A new method to treat the inherent instability of Lanczos-type algorithms is introduced. It enables ...
AbstractIterative methods for the solution of linear systems of equations produce a sequence of appr...
There are numerous algorithms for the solution of systems of linear equations and eigenvalue problem...
Iterative methods for the solution of linear systems of equations produce a sequence of approximate ...
Image reconstruction from projections gives rise to large ill-conditioned linear systems of equation...
When a system of linear equations is ill-conditioned, regularization techniques provide a quite usef...
The computation of an approximate solution of linear discrete illposed problems with contaminated da...
In this paper, we discuss several (old and new) estimates for the norm of the error in the solution ...