Summary Based Structures with Improved Sublinear Recovery for Compressed Sensing

Abstract

We introduce a new class of measurement matrices for compressed sensing, using low order summaries over binary sequences of a given length. We prove recovery guarantees for three reconstruction algorithms using the proposed measurements, including 1 minimization and two combinatorial methods. In particular, one of the algorithms recovers k-sparse vectors of length N in sublinear time poly(kN), and requires at most (kNN) measurements. The empirical oversampling constant of the algorithm is significantly better than existing sublinear recovery algorithms such as Chaining Pursuit and Sudocodes. In particular, for 103≤ N≤ 108 and k=100, the oversampling factor is between 3 to 8. We provide preliminary insight into how the proposed constructions, and the fast recovery scheme can be used in a number of practical applications such as market basket analysis, and real time compressed sensing implementation.