English

Masked Toeplitz covariance estimation

Information Theory 2017-09-28 v1 math.IT

Abstract

The problem of estimating the covariance matrix Σ\Sigma of a pp-variate distribution based on its nn observations arises in many data analysis contexts. While for n>pn>p, the classical sample covariance matrix Σ^n\hat{\Sigma}_n is a good estimator for Σ\Sigma, it fails in the high-dimensional setting when npn\ll p. In this scenario one requires prior knowledge about the structure of the covariance matrix in order to construct reasonable estimators. Under the common assumption that Σ\Sigma is sparse, a refined estimator is given by MΣ^nM\cdot\hat{\Sigma}_n, where MM is a suitable symmetric mask matrix indicating the nonzero entries of Σ\Sigma and \cdot denotes the entrywise product of matrices. In the present work we assume that Σ\Sigma has Toeplitz structure corresponding to stationary signals. This suggests to average the sample covariance Σ^n\hat{\Sigma}_n over the diagonals in order to obtain an estimator Σ~n\tilde{\Sigma}_n of Toeplitz structure. Assuming in addition that Σ\Sigma is sparse suggests to study estimators of the form MΣ~nM\cdot\tilde{\Sigma}_n. For Gaussian random vectors and, more generally, random vectors satisfying the convex concentration property, our main result bounds the estimation error in terms of nn and pp and shows that accurate estimation is indeed possible when npn \ll p. The new bound significantly generalizes previous results by Cai, Ren and Zhou and provides an alternative proof. Our analysis exploits the connection between the spectral norm of a Toeplitz matrix and the supremum norm of the corresponding spectral density function.

Keywords

Cite

@article{arxiv.1709.09377,
  title  = {Masked Toeplitz covariance estimation},
  author = {Maryia Kabanava and Holger Rauhut},
  journal= {arXiv preprint arXiv:1709.09377},
  year   = {2017}
}
R2 v1 2026-06-22T21:56:18.998Z