Recovery of Binary Sparse Signals With Biased Measurement Matrices

This paper treats the recovery of sparse, binary signals through box-constrained basis pursuit using biased measurement matrices. Using a probabilistic model, we provide conditions under which the recovery of both sparse and saturated binary signals is very likely. In fact, we also show that under the same condition, the solution of the boxed-constrained basis pursuit program can be found using boxed-constrained least squares.

[1]  E. Candès,et al.  Error correction via linear programming , 2005, FOCS 2005.

[2]  Gitta Kutyniok,et al.  PROMP: A sparse recovery approach to lattice-valued signals , 2017, Applied and Computational Harmonic Analysis.

[3]  David L. Donoho,et al.  Counting the Faces of Randomly-Projected Hypercubes and Orthants, with Applications , 2008, Discret. Comput. Geom..

[4]  Yonina C. Eldar,et al.  Spatial Compressive Sensing for MIMO Radar , 2013, IEEE Transactions on Signal Processing.

[5]  D. Donoho,et al.  Counting faces of randomly-projected polytopes when the projection radically lowers dimension , 2006, math/0607364.

[6]  Yonina C. Eldar,et al.  Introduction to Compressed Sensing , 2022 .

[7]  Jean Bourgain,et al.  On the singularity probability of discrete random matrices , 2009, 0905.0461.

[8]  Mihailo Stojnic,et al.  A simple performance analysis of ℓ1 optimization in compressed sensing , 2009, 2009 IEEE International Conference on Acoustics, Speech and Signal Processing.

[9]  Dennis Amelunxen,et al.  Gordon's inequality and condition numbers in conic optimization , 2014, 1408.3016.

[10]  Joel A. Tropp,et al.  Living on the edge: phase transitions in convex programs with random data , 2013, 1303.6672.

[11]  慧 廣瀬 A Mathematical Introduction to Compressive Sensing , 2015 .

[12]  Gitta Kutyniok,et al.  Compressed Sensing for Finite-Valued Signals , 2016, 1609.09450.

[13]  Peter Jung,et al.  Robust Nonnegative Sparse Recovery and the Nullspace Property of 0/1 Measurements , 2016, IEEE Transactions on Information Theory.

[14]  Erik G. Larsson,et al.  Spectrum Sensing for Cognitive Radio : State-of-the-Art and Recent Advances , 2012, IEEE Signal Processing Magazine.

[15]  M. Rudelson,et al.  Hanson-Wright inequality and sub-gaussian concentration , 2013 .