Statistical Compressed Sensing of Gaussian Mixture Models

TL;DR

This paper introduces statistical compressed sensing (SCS), a new framework that efficiently samples and reconstructs signals modeled by Gaussian and Gaussian mixture models with fewer measurements and faster decoding than traditional methods.

Contribution

The paper develops a novel SCS framework for Gaussian and GMM signals, providing theoretical bounds, efficient decoding algorithms, and demonstrating improved performance in image sensing applications.

Findings

SCS achieves accurate reconstruction with O(k) measurements, fewer than traditional CS.

Gaussian SCS error is tightly bounded and has lower failure probability.

GMM-based SCS improves image sensing results with lower computational cost.

Abstract

A novel framework of compressed sensing, namely statistical compressed sensing (SCS), that aims at efficiently sampling a collection of signals that follow a statistical distribution, and achieving accurate reconstruction on average, is introduced. SCS based on Gaussian models is investigated in depth. For signals that follow a single Gaussian model, with Gaussian or Bernoulli sensing matrices of O(k) measurements, considerably smaller than the O(k log(N/k)) required by conventional CS based on sparse models, where N is the signal dimension, and with an optimal decoder implemented via linear filtering, significantly faster than the pursuit decoders applied in conventional CS, the error of SCS is shown tightly upper bounded by a constant times the best k-term approximation error, with overwhelming probability. The failure probability is also significantly smaller than that of conventional sparsity-oriented CS. Stronger yet simpler results further show that for any sensing matrix, the error of Gaussian SCS is upper bounded by a constant times the best k-term approximation with probability one, and the bound constant can be efficiently calculated. For Gaussian mixture models (GMMs), that assume multiple Gaussian distributions and that each signal follows one of them with an unknown index, a piecewise linear estimator is introduced to decode SCS. The accuracy of model selection, at the heart of the piecewise linear decoder, is analyzed in terms of the properties of the Gaussian distributions and the number of sensing measurements. A maximum a posteriori expectation-maximization algorithm that iteratively estimates the Gaussian models parameters, the signals model selection, and decodes the signals, is presented for GMM-based SCS. In real image sensing applications, GMM-based SCS is shown to lead to improved results compared to conventional CS, at a considerably lower computational cost.