English

Deterministic Construction of Binary, Bipolar and Ternary Compressed Sensing Matrices

Information Theory 2015-03-13 v2 math.IT

Abstract

In this paper we establish the connection between the Orthogonal Optical Codes (OOC) and binary compressed sensing matrices. We also introduce deterministic bipolar m×nm\times n RIP fulfilling ±1\pm 1 matrices of order kk such that mO(k(log2n)log2klnlog2k)m\leq\mathcal{O}\big(k (\log_2 n)^{\frac{\log_2 k}{\ln \log_2 k}}\big). The columns of these matrices are binary BCH code vectors where the zeros are replaced by -1. Since the RIP is established by means of coherence, the simple greedy algorithms such as Matching Pursuit are able to recover the sparse solution from the noiseless samples. Due to the cyclic property of the BCH codes, we show that the FFT algorithm can be employed in the reconstruction methods to considerably reduce the computational complexity. In addition, we combine the binary and bipolar matrices to form ternary sensing matrices ({0,1,1}\{0,1,-1\} elements) that satisfy the RIP condition.

Keywords

Cite

@article{arxiv.0908.2676,
  title  = {Deterministic Construction of Binary, Bipolar and Ternary Compressed Sensing Matrices},
  author = {Arash Amini and Farokh Marvasti},
  journal= {arXiv preprint arXiv:0908.2676},
  year   = {2015}
}

Comments

The paper is accepted for publication in IEEE Transaction on Information Theory

R2 v1 2026-06-21T13:36:44.911Z