Abstract. In image processing applications, image intensity is often measured via the counting of incident photons emitted by the object of interest. In such cases, image data-noise is accurately modeled by a Poisson distribution. This motivates the use of Poisson maximum likelihood estimation for image reconstruction. However, when the underlying model equation is ill-posed, regularization is needed. Regularized Poisson likelihood estimation has been studied extensively by the authors, though a problem of high importance remains: the choice of the regularization parameter. We will present three statistically motivated methods for choosing the regularization parameter, and numerical examples will be presented to illustrate their effectivene...
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...
In this report we solved a regularized Poisson maximum likelihood (ML) image recon-struction problem...
In many imaging applications the image intensity is measured by counting incident particles and, con...
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 ...
Recently, Poisson noise has become of great interest in many imaging applications. When regularizati...
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 ...
Inverse problems with Poisson data arise in many photonic imaging modalities in medicine, engineerin...
In applications of imaging science, such as emissiontomography, fluorescence microscopy and optical/...
Abstract. The noise contained in data measured by imaging instruments is often primarily of Poisson ...
The application of Poisson data inversions is important in both specific and very different domains ...
Inverse Imaging with Poisson Data is an invaluable resource for graduate students, postdocs and rese...
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...
In this report we solved a regularized Poisson maximum likelihood (ML) image recon-struction problem...
In many imaging applications the image intensity is measured by counting incident particles and, con...
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 ...
Recently, Poisson noise has become of great interest in many imaging applications. When regularizati...
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 ...
Inverse problems with Poisson data arise in many photonic imaging modalities in medicine, engineerin...
In applications of imaging science, such as emissiontomography, fluorescence microscopy and optical/...
Abstract. The noise contained in data measured by imaging instruments is often primarily of Poisson ...
The application of Poisson data inversions is important in both specific and very different domains ...
Inverse Imaging with Poisson Data is an invaluable resource for graduate students, postdocs and rese...
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...
In this report we solved a regularized Poisson maximum likelihood (ML) image recon-struction problem...