Mixing space-time derivatives for video compressive sensing

With the increasing use of compressive sensing techniques for better data acquisition and storage, the need for efficient, accurate, and robust reconstruction algorithms continues to be in demand. In this work we present a fast total variation based method for reconstructing video compressive sensing data. Video compressive sensing systems store video sequences by taking a linear combination of consecutive spatially compressed frames. In order to recover the original data, our method regularizes both the spatial and temporal components using a total variation semi-norm that mixes information between dimensions. This mixing provides a more consistent approximation of the connection between neighboring frames with little to no increase in complexity. The algorithm is easy to implement since each iteration contains two shrinkage steps and a few iterations of conjugate gradient. Numerical simulations on real data show large improvements in both the PSNR and visual quality of the reconstructed frame sequences using our method.

[1]  Ming Yan,et al.  Robust 1-bit Compressive Sensing Using Adaptive Outlier Pursuit , 2012, IEEE Transactions on Signal Processing.

[2]  Didier Le Gall,et al.  MPEG: a video compression standard for multimedia applications , 1991, CACM.

[3]  Shree K. Nayar,et al.  Video from a single coded exposure photograph using a learned over-complete dictionary , 2011, 2011 International Conference on Computer Vision.

[4]  Yin Zhang,et al.  An efficient augmented Lagrangian method with applications to total variation minimization , 2013, Computational Optimization and Applications.

[5]  Ashwin A. Wagadarikar,et al.  Single disperser design for coded aperture snapshot spectral imaging. , 2008, Applied optics.

[6]  Guillermo Sapiro,et al.  Coded aperture compressive temporal imaging , 2013, Optics express.

[7]  Xiaobai Sun,et al.  Video rate spectral imaging using a coded aperture snapshot spectral imager. , 2009, Optics express.

[8]  Wotao Yin,et al.  An Iterative Regularization Method for Total Variation-Based Image Restoration , 2005, Multiscale Model. Simul..

[9]  D. Donoho,et al.  Sparse MRI: The application of compressed sensing for rapid MR imaging , 2007, Magnetic resonance in medicine.

[10]  Richard G. Baraniuk,et al.  1-Bit compressive sensing , 2008, 2008 42nd Annual Conference on Information Sciences and Systems.

[11]  Guillermo Sapiro,et al.  Adaptive temporal compressive sensing for video , 2013, 2013 IEEE International Conference on Image Processing.

[12]  Tom Goldstein,et al.  The Split Bregman Method for L1-Regularized Problems , 2009, SIAM J. Imaging Sci..

[13]  José M. Bioucas-Dias,et al.  A New TwIST: Two-Step Iterative Shrinkage/Thresholding Algorithms for Image Restoration , 2007, IEEE Transactions on Image Processing.