Title | Alternating Minimization Method for Total Variation Based Wavelet Shrinkage Model |
Authors | Zeng, Tieyong Li, Xiaolong Ng, Michael |
Affiliation | Hong Kong Baptist Univ, Dept Math, Kowloon Tong, Hong Kong, Peoples R China. Peking Univ, Inst Comp Sci & Technol, Beijing 100871, Peoples R China. |
Keywords | Alternating minimization convergence Gibbs oscillation wavelet shrinkage total variation VARIATION DICTIONARY MODEL IMAGE DECOMPOSITION ALGORITHM RESTORATION CONSTRAINT RECOVERY |
Issue Date | 2010 |
Publisher | communications in computational physics |
Citation | COMMUNICATIONS IN COMPUTATIONAL PHYSICS.2010,8,(5),976-994. |
Abstract | In this paper, we introduce a novel hybrid variational model which generalizes the classical total variation method and the wavelet shrinkage method. An alternating minimization direction algorithm is then employed. We also prove that it converges strongly to the minimizer of the proposed hybrid model. Finally, some numerical examples illustrate clearly that the new model outperforms the standard total variation method and wavelet shrinkage method as it recovers better image details and avoids the Gibbs oscillations. |
URI | http://hdl.handle.net/20.500.11897/395281 |
ISSN | 1815-2406 |
DOI | 10.4208/cicp.210709.180310a |
Indexed | SCI(E) |
Appears in Collections: | 信息科学技术学院 |