Title :
Signal representations with minimum ℓ∞-norm
Author :
Studer, Christoph ; Wotao Yin ; Baraniuk, R.G.
Author_Institution :
Rice Univ., Houston, TX, USA
Abstract :
Maximum (or ℓ∞) norm minimization subject to an underdetermined system of linear equations finds use in a large number of practical applications, such as vector quantization, peak-to-average power ratio (PAPR) (or “crest factor”) reduction in wireless communication systems, approximate neighbor search, robotics, and control. In this paper, we analyze the fundamental properties of signal representations with minimum ℓ∞-norm. In particular, we develop bounds on the maximum magnitude of such representations using the uncertainty principle (UP) introduced by Lyubarskii and Vershynin, 2010, and we characterize the limits of ℓ∞-norm-based PAPR reduction. Our results show that matrices satisfying the UP, such as randomly subsampled Fourier or i.i.d. Gaussian matrices, enable the efficient computation of so-called democratic representations, which have both provably small ℓ∞-norm and low PAPR.
Keywords :
Fourier analysis; Gaussian processes; minimisation; signal representation; vector quantisation; ℓ∞-norm-based PAPR reduction; Gaussian matrix; UP; approximate neighbor search; control; crest factor reduction; democratic representation; linear equation; maximum magnitude; maximum norm minimization; minimum ℓ∞-norm; peak-to-average power ratio; randomly subsampled Fourier; robotics; signal representation; uncertainty principle; vector quantization; wireless communication system; Discrete cosine transforms; Minimization; Peak to average power ratio; Signal representation; Vectors; Wireless communication;
Conference_Titel :
Communication, Control, and Computing (Allerton), 2012 50th Annual Allerton Conference on
Conference_Location :
Monticello, IL
Print_ISBN :
978-1-4673-4537-8
DOI :
10.1109/Allerton.2012.6483364
