International audienceWe study the properties of a regularization method for inverse problems with joint Kullback-Leibler data term and regularization when the data and the operator are corrupted by some noise. We show the convergence of the method and we obtain convergence rates for the approximate solution of the inverse problem and for the operator when it is characterized by some kernel, under the assumption that some source conditions are satisfied. Numerical results showing the effect of the noise levels on the reconstructed solution are provided for Spectral Computerized Tomography
Abstract. During the past the convergence analysis for linear statistical inverse problems has mainl...
International audienceIn this paper, we propose two algorithms to solve a large class of linear inve...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...
International audienceWe study the properties of a regularization method for inverse problems with j...
Abstract. Regularization of ill-posed problems is only possible if certain bounds on the data noise ...
In this paper we consider discrete inverse problems for which noise becomes negligible compared to d...
International audienceWe study a non-linear statistical inverse problem, where we observe the noisy ...
Abstract. This paper is concerned with a novel regularisation technique for solving linear ill-posed...
International audienceWe study the properties of a regularization method for inverse problems corrup...
Abstract. We consider nonlinear inverse problems described by operator equations F (a) = u. Here a i...
In this thesis we consider a linear inverse problem Ax ≈ b with a smoothing operator A and a right-h...
This thesis is a contribution to the field of ill-posed inverse problems . During the last ten year...
Many inverse problems arising in practice can be modelled in the form of an operator equation (1.1) ...
In this thesis, we study the problem of recovering signals, in particular images, that approximately...
In this paper, we introduce a derivative-free, iterative method for solving nonlinear ill-posed prob...
Abstract. During the past the convergence analysis for linear statistical inverse problems has mainl...
International audienceIn this paper, we propose two algorithms to solve a large class of linear inve...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...
International audienceWe study the properties of a regularization method for inverse problems with j...
Abstract. Regularization of ill-posed problems is only possible if certain bounds on the data noise ...
In this paper we consider discrete inverse problems for which noise becomes negligible compared to d...
International audienceWe study a non-linear statistical inverse problem, where we observe the noisy ...
Abstract. This paper is concerned with a novel regularisation technique for solving linear ill-posed...
International audienceWe study the properties of a regularization method for inverse problems corrup...
Abstract. We consider nonlinear inverse problems described by operator equations F (a) = u. Here a i...
In this thesis we consider a linear inverse problem Ax ≈ b with a smoothing operator A and a right-h...
This thesis is a contribution to the field of ill-posed inverse problems . During the last ten year...
Many inverse problems arising in practice can be modelled in the form of an operator equation (1.1) ...
In this thesis, we study the problem of recovering signals, in particular images, that approximately...
In this paper, we introduce a derivative-free, iterative method for solving nonlinear ill-posed prob...
Abstract. During the past the convergence analysis for linear statistical inverse problems has mainl...
International audienceIn this paper, we propose two algorithms to solve a large class of linear inve...
We study inverse problems $F(f) =g$ with perturbed right-hand side $g^{\rm obs}$ corrupted by so-cal...