In this article we present a review of the Radon transform and the instability of the tomographic reconstruction process. We show some new mathematical results in tomography obtained by a variational formulation of the reconstruction problem based on the minimization of a Mumford–Shah type functional. Finally, we exhibit a physical interpretation of this new technique and discuss some possible generalizations
In medical imaging, the Radon transform, used for tomographic reconstruction, recovers a N-Dimension...
International audienceWe present a simple framework for solving different ill-posed inverse problems...
International audienceWe present a simple framework for solving different ill-posed inverse problems...
In this article we present a review of the Radon transform and the instability of the tomographic re...
We formulate the tomographic reconstruction problem in a variational setting. The object to be recon...
We formulate the tomographic reconstruction problem in a variational setting. The object to be recon...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
The goal of this work is to identify a density function of a physical body from a given data as the ...
The conference was devoted to the discussion of present and future techniques in medical imaging, in...
International audienceWe present a simple framework for solving different ill-posed inverse problems...
In medical imaging, the Radon transform, used for tomographic reconstruction, recovers a N-Dimension...
International audienceWe present a simple framework for solving different ill-posed inverse problems...
International audienceWe present a simple framework for solving different ill-posed inverse problems...
In this article we present a review of the Radon transform and the instability of the tomographic re...
We formulate the tomographic reconstruction problem in a variational setting. The object to be recon...
We formulate the tomographic reconstruction problem in a variational setting. The object to be recon...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
We present a review of the mathematical principles of computerized tomography. Topics treated includ...
The goal of this work is to identify a density function of a physical body from a given data as the ...
The conference was devoted to the discussion of present and future techniques in medical imaging, in...
International audienceWe present a simple framework for solving different ill-posed inverse problems...
In medical imaging, the Radon transform, used for tomographic reconstruction, recovers a N-Dimension...
International audienceWe present a simple framework for solving different ill-posed inverse problems...
International audienceWe present a simple framework for solving different ill-posed inverse problems...
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