Instance-Optimal Compressed Sensing via Posterior Sampling
Machine Learning
2021-06-23 v1 Information Theory
math.IT
Machine Learning
Abstract
We characterize the measurement complexity of compressed sensing of signals drawn from a known prior distribution, even when the support of the prior is the entire space (rather than, say, sparse vectors). We show for Gaussian measurements and \emph{any} prior distribution on the signal, that the posterior sampling estimator achieves near-optimal recovery guarantees. Moreover, this result is robust to model mismatch, as long as the distribution estimate (e.g., from an invertible generative model) is close to the true distribution in Wasserstein distance. We implement the posterior sampling estimator for deep generative priors using Langevin dynamics, and empirically find that it produces accurate estimates with more diversity than MAP.
Cite
@article{arxiv.2106.11438,
title = {Instance-Optimal Compressed Sensing via Posterior Sampling},
author = {Ajil Jalal and Sushrut Karmalkar and Alexandros G. Dimakis and Eric Price},
journal= {arXiv preprint arXiv:2106.11438},
year = {2021}
}