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 met...
We address discrete nonlinear inverse problems with weighted least squares and Tikhonov regularizati...
Ill-posed inverse problems are ubiquitous in applications. Understanding of algorithms for their sol...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...
Abstract. During the past the convergence analysis for linear statistical inverse problems has mainl...
We study a non-linear statistical inverse problem, where we observe the noisy image of a quantity th...
A number of regularization methods for discrete inverse problems consist in considering weighted ver...
AbstractIn this paper we discuss a relation between Learning Theory and Regularization of linear ill...
This paper studies the estimation of a nonparametric function ' from the inverse problem r = T' give...
In this work, we consider the linear inverse problem y = Ax+ε, where A: X → Y is a known linear oper...
Abstract. We consider nonlinear inverse problems described by operator equations F (a) = u. Here a i...
summary:We give a derivation of an a-posteriori strategy for choosing the regularization parameter i...
Typical inverse problems are ill-posed which frequently leads to difficulties in calculatingnumerica...
In this work, we analyze the regularizing property of the stochastic gradient descent for the numeri...
A convergence rate is established for nonstationary iterated Tikhonov regularization, applied to ill...
Multiplicative regularization solves a linear inverse problem by minimizing the product of the norm ...
We address discrete nonlinear inverse problems with weighted least squares and Tikhonov regularizati...
Ill-posed inverse problems are ubiquitous in applications. Understanding of algorithms for their sol...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...
Abstract. During the past the convergence analysis for linear statistical inverse problems has mainl...
We study a non-linear statistical inverse problem, where we observe the noisy image of a quantity th...
A number of regularization methods for discrete inverse problems consist in considering weighted ver...
AbstractIn this paper we discuss a relation between Learning Theory and Regularization of linear ill...
This paper studies the estimation of a nonparametric function ' from the inverse problem r = T' give...
In this work, we consider the linear inverse problem y = Ax+ε, where A: X → Y is a known linear oper...
Abstract. We consider nonlinear inverse problems described by operator equations F (a) = u. Here a i...
summary:We give a derivation of an a-posteriori strategy for choosing the regularization parameter i...
Typical inverse problems are ill-posed which frequently leads to difficulties in calculatingnumerica...
In this work, we analyze the regularizing property of the stochastic gradient descent for the numeri...
A convergence rate is established for nonstationary iterated Tikhonov regularization, applied to ill...
Multiplicative regularization solves a linear inverse problem by minimizing the product of the norm ...
We address discrete nonlinear inverse problems with weighted least squares and Tikhonov regularizati...
Ill-posed inverse problems are ubiquitous in applications. Understanding of algorithms for their sol...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...