This paper discusses the properties of certain risk estimators recently proposed to choose regularization parameters in ill-posed problems. A simple approach is Stein's unbiased risk estimator (SURE), which estimates the risk in the data space, while a recent modification (GSURE) estimates the risk in the space of the unknown variable. It seems intuitive that the latter is more appropriate for ill-posed problems, since the properties in the data space do not tell much about the quality of the reconstruction. We provide theoretical studies of both estimators for linear Tikhonov regularization in a finite dimensional setting and estimate the quality of the risk estimators, which also leads to asymptotic convergence results as the dimension of...
This paper documents the consequences of the identification failures in a class of linear ill-posed ...
The regularization of ill-posed systems of equations is carried out by corrections of the data or th...
We study a possiblity to use the structure of the regularization error for a posteriori choice of th...
This paper discusses the properties of certain risk estimators that recently regained popularity for...
This paper discusses the properties of certain risk estimators that recently regained popularity for...
This paper discusses the properties of certain risk estimators recently proposed to choose regulari...
In this paper, we propose a rigorous derivation of the expression of the projected Generalized Stein...
In this paper, we aim at recovering an unknown signal x0 from noisy L1measurements y=Phi*x0+w, where...
Algorithms to solve variational regularization of ill-posed inverse problems usually involve operato...
The straightforward solution of discrete ill-posed linear systems of equations or least-squares prob...
abstract: The solution of the linear system of equations $Ax\approx b$ arising from the discretizati...
Several prominent methods have been developed for the crucial selection of the parameter in regulari...
AbstractRegularized approximations to the solutions of ill-posed problems typically vary from over-s...
AbstractWe consider Tikhonov regularization of linear ill-posed problems with noisy data. The choice...
The reconstruction of an object from an image formed by an idealized optical system is considered. T...
This paper documents the consequences of the identification failures in a class of linear ill-posed ...
The regularization of ill-posed systems of equations is carried out by corrections of the data or th...
We study a possiblity to use the structure of the regularization error for a posteriori choice of th...
This paper discusses the properties of certain risk estimators that recently regained popularity for...
This paper discusses the properties of certain risk estimators that recently regained popularity for...
This paper discusses the properties of certain risk estimators recently proposed to choose regulari...
In this paper, we propose a rigorous derivation of the expression of the projected Generalized Stein...
In this paper, we aim at recovering an unknown signal x0 from noisy L1measurements y=Phi*x0+w, where...
Algorithms to solve variational regularization of ill-posed inverse problems usually involve operato...
The straightforward solution of discrete ill-posed linear systems of equations or least-squares prob...
abstract: The solution of the linear system of equations $Ax\approx b$ arising from the discretizati...
Several prominent methods have been developed for the crucial selection of the parameter in regulari...
AbstractRegularized approximations to the solutions of ill-posed problems typically vary from over-s...
AbstractWe consider Tikhonov regularization of linear ill-posed problems with noisy data. The choice...
The reconstruction of an object from an image formed by an idealized optical system is considered. T...
This paper documents the consequences of the identification failures in a class of linear ill-posed ...
The regularization of ill-posed systems of equations is carried out by corrections of the data or th...
We study a possiblity to use the structure of the regularization error for a posteriori choice of th...