Low-Rank Toeplitz Matrix Restoration: Descent Cone Analysis and Structured Random Matrix

Abstract

This note demonstrates that we can stably recover all symmetric Toeplitz matrices X0∈Rn× n of rank at most r from a number of rank-one subgaussian measurements on the order of r2 n with an exponentially decreasing failure probability by employing a nuclear norm minimization program. Our approach utilizes descent cone analysis through Mendelson's small ball method with the Toeplitz constraint. The key ingredient is to determine the spectral norm of a random matrix with Toeplitz structure, which may be of independent interest. This improves upon earlier analyses and resolves the conjecture in Chen et al. (IEEE Transactions on Information Theory, 61(7):4034--4059, 2015).