Improved bounds for sparse recovery from subsampled random convolutions
Abstract
We study the recovery of sparse vectors from subsampled random convolutions via -minimization. We consider the setup in which both the subsampling locations as well as the generating vector are chosen at random. For a subgaussian generator with independent entries, we improve previously known estimates: if the sparsity is small enough, i.e., , we show that measurements are sufficient to recover -sparse vectors in dimension with high probability, matching the well-known condition for recovery from standard Gaussian measurements. If is larger, then essentially measurements are sufficient, again improving over previous estimates. Our results are shown via the so-called robust null space property which is weaker than the standard restricted isometry property. Our method of proof involves a novel combination of small ball estimates with chaining techniques {which should be of independent interest.
Cite
@article{arxiv.1610.04983,
title = {Improved bounds for sparse recovery from subsampled random convolutions},
author = {Shahar Mendelson and Holger Rauhut and Rachel Ward},
journal= {arXiv preprint arXiv:1610.04983},
year = {2018}
}
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34 pages