1. Optimal Discretization Resolution in Algebraic Image Reconstruction.
- Author
-
Sharif, Behzad and Kamalabadi, Farzad
- Subjects
IMAGE reconstruction ,IMAGE processing ,TOMOGRAPHY ,ALGORITHMS ,ALGEBRA ,BAYES' estimation - Abstract
In this paper, we focus on data-limited tomographic imaging problems where the underlying linear inverse problem is ill-posed. A typical regularized reconstruction algorithm uses algebraic formulation with a predetermined discretization resolution. If the selected resolution is too low, we may loose useful details of the underlying image and if it is too high, the reconstruction will be unstable and the representation will fit irrelevant features. In this work, two approaches are introduced to address this issue. The first approach is using Mallow’s CL method or generalized cross-validation. For each of the two methods, a joint estimator of regularization parameter and discretization resolution is proposed and their asymptotic optimality is investigated. The second approach is a Bayesian estimator of the model order using a complexity-penalizing prior. Numerical experiments focus on a space imaging application from a set of limited-angle tomographic observations. © 2005 American Institute of Physics [ABSTRACT FROM AUTHOR]
- Published
- 2005
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