论文信息 - A uniform uncertainty principle for Gaussian circulant matrices

A uniform uncertainty principle for Gaussian circulant matrices

This paper considers the problem of estimating a discrete signal from its convolution with a pulse consisting of a sequence of independent and identically distributed Gaussian random variables. We derive lower bounds on the length of a random pulse needed to stably reconstruct a signal supported on [1, n]. We will show that a general signal can be stably recovered from convolution with a pulse of length m ≳ n log5 n, and a sparse signal which can be closely approximated using s ≲ n/log5 n terms can be stably recovered with a pulse of length n.

Justin Romberg | J. Romberg

[1] J. Tropp,et al. CoSaMP: Iterative signal recovery from incomplete and inaccurate samples , 2008, Commun. ACM.

[2] Justin K. Romberg,et al. Compressive Sensing by Random Convolution , 2009, SIAM J. Imaging Sci..

[3] M. Meckes. On the spectral norm of a random Toeplitz matrix , 2007, math/0703134.

[4] Mike E. Davies,et al. Iterative Hard Thresholding for Compressed Sensing , 2008, ArXiv.

[5] M. Rudelson,et al. On sparse reconstruction from Fourier and Gaussian measurements , 2008 .

[6] M. Talagrand,et al. Probability in Banach spaces , 1991 .

[7] David L Donoho,et al. Compressed sensing , 2006, IEEE Transactions on Information Theory.

[8] Robert D. Nowak,et al. Toeplitz Compressed Sensing Matrices With Applications to Sparse Channel Estimation , 2010, IEEE Transactions on Information Theory.

[9] Justin K. Romberg,et al. Beyond Nyquist: Efficient Sampling of Sparse Bandlimited Signals , 2009, IEEE Transactions on Information Theory.

[10] Emmanuel J. Candès,et al. Near-Optimal Signal Recovery From Random Projections: Universal Encoding Strategies? , 2004, IEEE Transactions on Information Theory.

[11] E. Candès,et al. Stable signal recovery from incomplete and inaccurate measurements , 2005, math/0503066.