Add to ORKGIn this paper, we show that minimization problems involving sublinear regularizing terms are ill-posed, in general, although numerical experiments in image processing give very good results. The energies studied here are inspired by image restoration and image decomposition. Rewriting the nonconvex sublinear regularizing terms as weighted total variations, we give a new approach to perform minimization via the well-known Chambolle’s algorithm. The approach developed here provides an alternative to the well-known half-quadratic minimization one
A solution of various problems in image analysis using concurrent minimization of total variation an...
It has been shown recently that iterative regularization using conjugate gradient type methods for i...
In many inverse problems the operator to be inverted is not known precisely, but only a noisy versio...
AbstractIn this paper, we show that minimization problems involving sublinear regularizing terms are...
It is well known that minimization problems involving sublinear regularization terms are ill-posed, ...
Disponible en ligne depuis le 4 juillet 2008 sur le site sciencedirectInternational audienc
International audienceIn the usual non-local variational models, such as the non-local total variati...
The Tikhonov-Phillips method is widely used for regularizing ill-posed problems due to the simplicit...
The minimization of a functional composed of a nonsmooth and nonadditive regularization term and a c...
Abstract—A popular way to restore images comprising edges is to minimize a cost function combining a...
Abstract. We present a new mixed regularization method for image recovery. The method is based on th...
Ill-posed problems arise in many areas of science and engineering. Their solutions, if they exist, a...
Computer vision requires the solution of many ill-posed problems such as optical flow, structure fro...
We present a new mixed regularization method for image recovery. The method is based on the combinat...
Abstract. In many inverse problems it is essential to use regularization methods that preserve edges...
A solution of various problems in image analysis using concurrent minimization of total variation an...
It has been shown recently that iterative regularization using conjugate gradient type methods for i...
In many inverse problems the operator to be inverted is not known precisely, but only a noisy versio...
AbstractIn this paper, we show that minimization problems involving sublinear regularizing terms are...
It is well known that minimization problems involving sublinear regularization terms are ill-posed, ...
Disponible en ligne depuis le 4 juillet 2008 sur le site sciencedirectInternational audienc
International audienceIn the usual non-local variational models, such as the non-local total variati...
The Tikhonov-Phillips method is widely used for regularizing ill-posed problems due to the simplicit...
The minimization of a functional composed of a nonsmooth and nonadditive regularization term and a c...
Abstract—A popular way to restore images comprising edges is to minimize a cost function combining a...
Abstract. We present a new mixed regularization method for image recovery. The method is based on th...
Ill-posed problems arise in many areas of science and engineering. Their solutions, if they exist, a...
Computer vision requires the solution of many ill-posed problems such as optical flow, structure fro...
We present a new mixed regularization method for image recovery. The method is based on the combinat...
Abstract. In many inverse problems it is essential to use regularization methods that preserve edges...
A solution of various problems in image analysis using concurrent minimization of total variation an...
It has been shown recently that iterative regularization using conjugate gradient type methods for i...
In many inverse problems the operator to be inverted is not known precisely, but only a noisy versio...