Journal
APPLIED NUMERICAL MATHEMATICS
Volume 184, Issue -, Pages 371-390Publisher
ELSEVIER
DOI: 10.1016/j.apnum.2022.10.009
Keywords
Split Bregman method; Krylov method; Golub-Kahan bidiagonalization; Fixed point algorithm; Cross validation
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This paper investigates the possibility of projecting large-scale problems into a Krylov subspace of small dimension and solving the minimization problem using a split Bregman algorithm. The focus is on restoring images contaminated by blur and noise. Computed examples demonstrate that the projected split Bregman methods described are fast and yield high-quality solutions.
Split Bregman methods are popular iterative methods for the solution of large-scale minimization problems that arise in image restoration and basis pursuit. This paper investigates the possibility of projecting large-scale problems into a Krylov subspace of fairly small dimension and solving the minimization problem in the latter subspace by a split Bregman algorithm. We are concerned with the restoration of images that have been contaminated by blur and Gaussian or impulse noise. Computed examples illustrate that the projected split Bregman methods described are fast and give computed solutions of high quality. (c) 2022 IMACS. Published by Elsevier B.V. All rights reserved.
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