AbstractA problem is said to be ill-posed if the solution of the problem does not depend continuously on the input data. In this survey paper, we consider two different information-based settings for the optimal computation of approximate solution of ill-posed linear problems, namely the worst case and average case settings. These settings are studied for two different error criteria, namely, the absolute error and the residual error criteria. The main result for the absolute-error criterion is that algorithms having finite error exist for a given setting if and only if the solution operator is bounded in that setting. In the worst case setting with an absolute error criterion, this means that there is no algorithm for solving ill-posed pro...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
AbstractStraightforward solution of discrete ill-posed least-squares problems with error-contaminate...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...
A problem is said to be ill-posed if the solution of the problem does not depend continuously on the...
AbstractA problem is said to be ill-posed if the solution of the problem does not depend continuousl...
AbstractNew projection discrete schemes for ill-posed problems are constructed. We show that for equ...
AbstractWe wish to solve an ill-posed problem whose solution operator S is a measurable unbounded li...
The advent of the computer had forced the application of mathematics to all branches of human endeav...
This paper deals with the so-called total ill-posedness of linear optimization problems with an arbi...
Abstract : The theory of solving linear and nonlinear ill-posed problems is advanced greatly today (...
In this paper we develop a procedure to deal with a family of parameter-dependent ill-posed problems...
AbstractIn this paper, we consider a finite-dimensional approximation scheme combined with Tikhonov ...
The computation of an approximate solution of linear discrete illposed problems with contaminated da...
Abstract — We discuss methods to compute error bounds for extremely ill-conditioned problems. As a m...
AbstractWe shall study maximal errors of approximating linear problems. As possible classes of infor...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
AbstractStraightforward solution of discrete ill-posed least-squares problems with error-contaminate...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...
A problem is said to be ill-posed if the solution of the problem does not depend continuously on the...
AbstractA problem is said to be ill-posed if the solution of the problem does not depend continuousl...
AbstractNew projection discrete schemes for ill-posed problems are constructed. We show that for equ...
AbstractWe wish to solve an ill-posed problem whose solution operator S is a measurable unbounded li...
The advent of the computer had forced the application of mathematics to all branches of human endeav...
This paper deals with the so-called total ill-posedness of linear optimization problems with an arbi...
Abstract : The theory of solving linear and nonlinear ill-posed problems is advanced greatly today (...
In this paper we develop a procedure to deal with a family of parameter-dependent ill-posed problems...
AbstractIn this paper, we consider a finite-dimensional approximation scheme combined with Tikhonov ...
The computation of an approximate solution of linear discrete illposed problems with contaminated da...
Abstract — We discuss methods to compute error bounds for extremely ill-conditioned problems. As a m...
AbstractWe shall study maximal errors of approximating linear problems. As possible classes of infor...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
AbstractStraightforward solution of discrete ill-posed least-squares problems with error-contaminate...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...