Recently, Poisson noise has become of great interest in many imaging applications. When regularization strategies are used in the so-called Bayesian approach, a relevant issue is to find rules for selecting a proper value of the regularization parameter. In this work we compare three different approaches which deal with this topic. The first model aims to find the root of a discrepancy equation, while the second one estimates such parameter by adopting a constrained approach. These two models do not always provide reliable results in presence of low counts images. The third approach presented is the inexact Bregman procedure, which allows to use an overestimation of the regularization parameter and moreover enables to obtain very promising ...
This work deals with the solution of image restoration problems by an iterative regularization metho...
The problem of restoring images corrupted by Poisson noise is common in many application fields and,...
The application of Poisson data inversions is important in both specific and very different domains ...
Recently, Poisson noise has become of great interest in many imaging applications. When regularizati...
In many imaging applications the image intensity is measured by counting incident particles and, con...
Abstract. In image processing applications, image intensity is often measured via the counting of in...
In applications of imaging science, such as emissiontomography, fluorescence microscopy and optical/...
A common problem in imaging science is to estimate some underlying true image given noisy measuremen...
The noise contained in images collected by a charge coupled device (CCD) camera is predominantly of ...
The noise contained in images collected by a charge coupled device (CCD) camera is predominantly of ...
Abstract. Let z = Au+ γ, where γ> 0 is constant, be an ill-posed, linear operator equation. Such ...
The noise contained in images collected by a charge coupled device (CCD) camera is predominantly of ...
Abstract—Poisson inverse problems arise in many modern imaging applications, including biomedical an...
This work deals with the solution of image restoration problems by an iterative regularization metho...
The noise contained in images collected by a charge coupled device (CCD) camera is predominantly of ...
This work deals with the solution of image restoration problems by an iterative regularization metho...
The problem of restoring images corrupted by Poisson noise is common in many application fields and,...
The application of Poisson data inversions is important in both specific and very different domains ...
Recently, Poisson noise has become of great interest in many imaging applications. When regularizati...
In many imaging applications the image intensity is measured by counting incident particles and, con...
Abstract. In image processing applications, image intensity is often measured via the counting of in...
In applications of imaging science, such as emissiontomography, fluorescence microscopy and optical/...
A common problem in imaging science is to estimate some underlying true image given noisy measuremen...
The noise contained in images collected by a charge coupled device (CCD) camera is predominantly of ...
The noise contained in images collected by a charge coupled device (CCD) camera is predominantly of ...
Abstract. Let z = Au+ γ, where γ> 0 is constant, be an ill-posed, linear operator equation. Such ...
The noise contained in images collected by a charge coupled device (CCD) camera is predominantly of ...
Abstract—Poisson inverse problems arise in many modern imaging applications, including biomedical an...
This work deals with the solution of image restoration problems by an iterative regularization metho...
The noise contained in images collected by a charge coupled device (CCD) camera is predominantly of ...
This work deals with the solution of image restoration problems by an iterative regularization metho...
The problem of restoring images corrupted by Poisson noise is common in many application fields and,...
The application of Poisson data inversions is important in both specific and very different domains ...