Title :
Sparse image super-resolution via superset selection and pruning
Author :
Nam Nguyen ; Demanet, Laurent
Author_Institution :
Dept. of Math., Massachusetts Inst. of Technol., Cambridge, MA, USA
Abstract :
This note extends the superset method for sparse signal recovery from bandlimited measurements to the two-dimensional case. The algorithm leverages translation-invariance of the Fourier basis functions by constructing a Hankel tensor, and identifying the signal subspace from its range space. In the noisy case, this method determines a superset which then needs to undergo pruning. The method displays reasonable robustness to noise, and unlike ℓ1 minimization, always succeeds in the noiseless case.
Keywords :
Fourier analysis; image resolution; tensors; Fourier basis functions; Hankel tensor; image superresolution; noiseless case; range space; signal subspace; sparse signal recovery; superset pruning; superset selection; translation-invariance; two-dimensional case; Conferences; Image resolution; Minimization; Noise; Radio access networks; Signal resolution; Tensile stress;
Conference_Titel :
Computational Advances in Multi-Sensor Adaptive Processing (CAMSAP), 2013 IEEE 5th International Workshop on
Conference_Location :
St. Martin
Print_ISBN :
978-1-4673-3144-9
DOI :
10.1109/CAMSAP.2013.6714044
