Title :
1-bit Hamming compressed sensing
Author :
Tianyi Zhou ; Dacheng Tao
Author_Institution :
Centre for Quantum Comput. & Intell. Syst., Univ. of Technol. Sydney, Sydney, NSW, Australia
Abstract :
Compressed sensing (CS) and 1-bit CS cannot directly recover quantized signals preferred in digital systems and require time consuming recovery. In this paper, we introduce 1-bit Hamming compressed sensing (HCS) that directly recovers a k-bit quantized signal of dimension n from its 1-bit measurements via invoking n times of Kullback-Leibler divergence based nearest neighbor search. Compared to CS and 1-bit CS, 1-bit HCS allows the signal to be dense, takes considerably less (linear and non-iterative) recovery time and requires substantially less measurements. Moreover, 1-bit HCS can accelerate 1bit CS recover. We study a quantized recovery error bound of 1-bit HCS for general signals. Extensive numerical simulations verify the appealing accuracy, robustness, efficiency and consistency of 1-bit HCS.
Keywords :
compressed sensing; quantisation (signal); 1-bit HCS; 1-bit Hamming compressed sensing; Kullback-Leibler divergence; digital system; linear recovery time; nearest neighbor search; noniterative recovery time; quantized recovery error bound; quantized signal; time consuming recovery; Compressed sensing; Digital systems; Estimation; Nearest neighbor searches; Quantization; Robustness; Upper bound;
Conference_Titel :
Information Theory Proceedings (ISIT), 2012 IEEE International Symposium on
Conference_Location :
Cambridge, MA
Print_ISBN :
978-1-4673-2580-6
Electronic_ISBN :
2157-8095
DOI :
10.1109/ISIT.2012.6283603
