Add to ORKGAbstract. During the past the convergence analysis for linear statistical inverse problems has mainly focused on spectral cut-off and Tikhonov type estimators. Spectral cut-off estimators achieve minimax rates for a broad range of smoothness classes and operators, but their practical usefulness is limited by the fact that they require a complete spectral decomposition of the operator. Tikhonov estimators are simpler to compute, but still involve the inversion of an operator and achieve minimax rates only in restricted smoothness classes. In this paper we introduce a unifying technique to study the mean square error of a large class of regularization methods (spectral methods) including the aforementioned estimators as well as many iterative...
In recent years, a series of convergence rates conditions for regulariza-tion methods has been devel...
We consider regularized solutions of linear inverse ill-posed problems obtained with generalized Tik...
The concept of qualification for spectral regularization methods (SRM) for inverse ill-posed problem...
During the past the convergence analysis for linear statistical inverse problems has mainly focused ...
International audienceWe study a non-linear statistical inverse problem, where we observe the noisy ...
International audienceWe study a non-linear statistical inverse problem, where we observe the noisy ...
We study a non-linear statistical inverse problem, where we observe the noisy image of a quantity th...
We study a non-linear statistical inverse problem, where we observe the noisy image of a quantity th...
Abstract. We consider nonlinear inverse problems described by operator equations F (a) = u. Here a i...
Abstract. We consider nonlinear inverse problems described by operator equations F (a) = u. Here a i...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...
This paper studies the estimation of a nonparametric function \varphi from the inverse problem r = T...
In this chapter we present the basic concepts of numerical regularization theory. We analyze direct ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/87...
In recent years, a series of convergence rates conditions for regulariza-tion methods has been devel...
We consider regularized solutions of linear inverse ill-posed problems obtained with generalized Tik...
The concept of qualification for spectral regularization methods (SRM) for inverse ill-posed problem...
During the past the convergence analysis for linear statistical inverse problems has mainly focused ...
International audienceWe study a non-linear statistical inverse problem, where we observe the noisy ...
International audienceWe study a non-linear statistical inverse problem, where we observe the noisy ...
We study a non-linear statistical inverse problem, where we observe the noisy image of a quantity th...
We study a non-linear statistical inverse problem, where we observe the noisy image of a quantity th...
Abstract. We consider nonlinear inverse problems described by operator equations F (a) = u. Here a i...
Abstract. We consider nonlinear inverse problems described by operator equations F (a) = u. Here a i...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...
This paper studies the estimation of a nonparametric function \varphi from the inverse problem r = T...
In this chapter we present the basic concepts of numerical regularization theory. We analyze direct ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/87...
In recent years, a series of convergence rates conditions for regulariza-tion methods has been devel...
We consider regularized solutions of linear inverse ill-posed problems obtained with generalized Tik...
The concept of qualification for spectral regularization methods (SRM) for inverse ill-posed problem...