A discrepancy principle for Poisson data

Bertero, M.; Boccacci, Patrizia; Talenti, Giorgio; Zanella, Riccardo; Zanni, Luca

doi:10.1088/0266-5611/26/10/105004

Cited by 103 publications

(150 citation statements)

References 33 publications

(106 reference statements)

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“…We denote this error ρ w (for sake of completeness, we point out that we enumerate the pixels from 1 to 1024 in both directions). As previously mentioned, in practical applications, only an estimate of β opt can be obtained (see Bertero et al 2010;Bardsley & Goldes 2009). Moreover, the numerical experience (see Benfenati & Ruggiero 2015) has shown that these methods cannot provide satisfactory results for some classes of images (such as the image treated in this work) because of the hypothesis underlying these techniques.…”

Section: Resultsmentioning

confidence: 99%

“…The parameter β is named regularization parameter and it measures the trade-off between f 0 and f 1 . In practical application, one needs the value that gives the best reconstruction, but actually this value is very difficult to estimate (see Bertero et al 2010;Bardsley & Goldes 2009, for the Poisson case).…”

Section: Generalitiesmentioning

confidence: 99%

“…A practical strategy consists in estimating β with one of the methods mentioned previously in the paper (e.g. Bertero et al 2010;Bardsley & Goldes 2009), and then multiply the obtained value (namely β) by a factor γ > 1. Four scenarios may arise by adopting this strategy:…”

Section: Connected X P Regionmentioning

confidence: 99%

See 2 more Smart Citations

Deconvolution of post-adaptive optics images of faint circumstellar environments by means of the inexact Bregman procedure

Benfenati

Camera

Carbillet

2016

A&A

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Aims. High-dynamic range images of astrophysical objects present some difficulties in their restoration because of the presence of very bright point-wise sources surrounded by faint and smooth structures. We propose a method that enables the restoration of this kind of images by taking these kinds of sources into account and, at the same time, improving the contrast enhancement in the final image. Moreover, the proposed approach can help to detect the position of the bright sources. Methods. The classical variational scheme in the presence of Poisson noise aims to find the minimum of a functional compound of the generalized Kullback-Leibler function and a regularization functional: the latter function is employed to preserve some characteristic in the restored image. The inexact Bregman procedure substitutes the regularization function with its inexact Bregman distance. This proposed scheme allows us to take under control the level of inexactness arising in the computed solution and permits us to employ an overestimation of the regularization parameter (which balances the trade-off between the Kullback-Leibler and the Bregman distance). This aspect is fundamental, since the estimation of this kind of parameter is very difficult in the presence of Poisson noise. Results. The inexact Bregman procedure is tested on a bright unresolved binary star with a faint circumstellar environment. When the sources' position is exactly known, this scheme provides us with very satisfactory results. In case of inexact knowledge of the sources' position, it can in addition give some useful information on the true positions. Finally, the inexact Bregman scheme can be also used when information about the binary star's position concerns a connected region instead of isolated pixels.

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Section: Resultsmentioning

confidence: 99%

Section: Generalitiesmentioning

confidence: 99%

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Deconvolution of post-adaptive optics images of faint circumstellar environments by means of the inexact Bregman procedure

Benfenati

Camera

Carbillet

2016

A&A

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“…The two first terms corresponds to the data fidelity component related to the Poisson statistic , Bertero et al [2010]). The third term is the total variation function (Rudin et al [1992]) which allows to smooth homogeneous areas of the recovered images while preserving sharp edges.…”

Section: Jmap Criterionmentioning

confidence: 99%

Space Variant Blind Image Restoration

Hadj

Blanc‐Féraud

Aubert³

2014

SIAM J. Imaging Sci.

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International audienceWe are interested in blind restoration of optical space variant blurred Poissonian images. For exam-ple, blur variation is due to refractive index mismatch in three-dimensional fluorescence microscopy or due to atmospheric turbulence in astrophysical images. In this work, the space variant point spread function (PSF) is approximated by a convex combination of a set of space invariant blurring functions. The latter is jointly estimated with the image by optimizing a given criterion including l1 and l2 norms for regularizing the image and the PSFs. We prove, in the continuous setting, the existence of a solution to this optimization problem. We then propose an alternating optimization algorithm based on a scaled gradient projection method. We show the efficiency of the proposed method on simulated and real optical images

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“…FISTA is an acceleration procedure for non constraint algorithms [5], and in the special case of the TV functional and ℓ 1 , additional constraints such as the positivity of the solution can be addressed [4]. The choice of the parameter λ in the regularization term was studied in [6] for data fidelity terms issued from a Poisson noise. In [13] an algorithm which belongs to primal-dual methods is described since primal and dual variables are successively computed in the algorithm.…”

Section: Incorporating Noisementioning

confidence: 99%

Some proximal methods for Poisson intensity CBCT and PET

Anthoine¹,

Aujol²,

Boursier³

et al. 2012

Inverse Problems &Amp; Imaging

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Cone-Beam Computerized Tomography (CBCT) and Positron Emission Tomography (PET) are two complementary medical imaging modalities providing respectively anatomic and metabolic information of a patient. In the context of public health, one must address the problem of dose reduction of the potentially harmful quantities related to each exam protocol : X-rays for CBCT and radiotracer for PET. Two demonstrators based on a technological breakthrough (acquisition devices work in photon-counting mode) have been developed and we investigate in this paper the two related tomographic reconstruction problems. We formulate separately the CBCT and the PET problems in two general frameworks that encompass the physics of the acquisition devices and the specific discretization of the object to reconstruct. These objects may be observed from a limited number of angles of views and we take into account the specificity of the Poisson noise. We propose various fast numerical schemes based on proximal methods to compute the solution of each problem. In particular, we show that primal-dual approaches are well suited in the PET case when considering non differentiable regularizations such as Total Variation. Experiments on numerical simulations and real data are in favor of the proposed algorithms when compared with the well-established methods.

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A discrepancy principle for Poisson data

Cited by 103 publications

References 33 publications

Deconvolution of post-adaptive optics images of faint circumstellar environments by means of the inexact Bregman procedure

Deconvolution of post-adaptive optics images of faint circumstellar environments by means of the inexact Bregman procedure

Space Variant Blind Image Restoration

Some proximal methods for Poisson intensity CBCT and PET

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