We consider the two-dimensional discrete nonnegatively constrained deconvolution problem, whose goal is to reconstruct an object x¤ from its image b obtained through an optical system and a®ected by noise. When the large size of the problem prevents regularization by ¯l- tering, iterative methods enjoying semiconvergence property, coupled with suitable strategies for enforcing nonnegativity, are suggested. For these methods an accurate detection of the stopping index is essential. In this paper we analyze various stopping rules and test their e®ect on three di®erent iterative regularizing methods, by a large experimenta- tion.
Stopping rules for iterative methods in nonnegatively constrained deconvolution
Favati Paola;
2011
Abstract
We consider the two-dimensional discrete nonnegatively constrained deconvolution problem, whose goal is to reconstruct an object x¤ from its image b obtained through an optical system and a®ected by noise. When the large size of the problem prevents regularization by ¯l- tering, iterative methods enjoying semiconvergence property, coupled with suitable strategies for enforcing nonnegativity, are suggested. For these methods an accurate detection of the stopping index is essential. In this paper we analyze various stopping rules and test their e®ect on three di®erent iterative regularizing methods, by a large experimenta- tion.File in questo prodotto:
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