Add to ORKGelectronic version (5 pp.)International audienceDuring the last five years, several convex optimization algorithms have been proposed for solving inverse problems. Most of the time, they allow us to minimize a criterion composed of two terms one of which permits to "stabilize" the solution. Different choices are possible for the so-called regularization term, which plays a prominent role for solving ill-posed problems. While a total variation regularization introduces staircase effects, a wavelet regularization may bring other kinds of visual artefacts. A compromise can be envisaged combining these regularization functions. In the context of Poisson data, we propose in this paper an algorithm to achieve the minimization of the associated (p...
International audienceThe Poisson-Gaussian model can accurately describe the noise present in a num...
International audienceThis paper presents a new method for solving linear inverse problems where the...
Abstract. The noise contained in data measured by imaging instruments is often primarily of Poisson ...
electronic version (5 pp.)International audienceDuring the last five years, several convex optimizat...
Regularization approaches have demonstrated their effectiveness for solving ill-posed problems. Howe...
International audienceRegularization approaches have demonstrated their effectiveness for solving il...
International audienceIn this paper, we propose two algorithms for solving linear inverse problems w...
International audienceIn this paper, we propose two algorithms for solving linear inverse problems w...
In many imaging applications the image intensity is measured by counting incident particles and, con...
Inverse problems with Poisson data arise in many photonic imaging modalities in medicine, engineerin...
International audienceIn this paper, we propose two algorithms to solve a large class of linear inve...
The problem of restoring images corrupted by Poisson noise is common in many application fields and,...
The restoration of the Poisson noisy images is an essential task in many imaging applications due to...
summary:In this paper, a hybrid regularizers model for Poissonian image restoration is introduced. W...
International audienceThe Poisson-Gaussian model can accurately describe the noise present in a num...
International audienceThis paper presents a new method for solving linear inverse problems where the...
Abstract. The noise contained in data measured by imaging instruments is often primarily of Poisson ...
electronic version (5 pp.)International audienceDuring the last five years, several convex optimizat...
Regularization approaches have demonstrated their effectiveness for solving ill-posed problems. Howe...
International audienceRegularization approaches have demonstrated their effectiveness for solving il...
International audienceIn this paper, we propose two algorithms for solving linear inverse problems w...
International audienceIn this paper, we propose two algorithms for solving linear inverse problems w...
In many imaging applications the image intensity is measured by counting incident particles and, con...
Inverse problems with Poisson data arise in many photonic imaging modalities in medicine, engineerin...
International audienceIn this paper, we propose two algorithms to solve a large class of linear inve...
The problem of restoring images corrupted by Poisson noise is common in many application fields and,...
The restoration of the Poisson noisy images is an essential task in many imaging applications due to...
summary:In this paper, a hybrid regularizers model for Poissonian image restoration is introduced. W...
International audienceThe Poisson-Gaussian model can accurately describe the noise present in a num...
International audienceThis paper presents a new method for solving linear inverse problems where the...
Abstract. The noise contained in data measured by imaging instruments is often primarily of Poisson ...