Entrywise Estimation of Singular Vectors of Low-Rank Matrices With Heteroskedasticity and Dependence

Joshua Agterberg, Zachary Lubberts, Carey E. Priebe

Research output: Contribution to journalArticlepeer-review

Abstract

We propose an estimator for the singular vectors of high-dimensional low-rank matrices corrupted by additive subgaussian noise, where the noise matrix is allowed to have dependence within rows and heteroskedasticity between them. We prove finite-sample 2,bounds and a Berry-Esseen theorem for the individual entries of the estimator, and we apply these results to high-dimensional mixture models. Our Berry-Esseen theorem clearly shows the geometric relationship between the signal matrix, the covariance structure of the noise, and the distribution of the errors in the singular vector estimation task. These results are illustrated in numerical simulations. Unlike previous results of this type, which rely on assumptions of Gaussianity or independence between the entries of the additive noise, handling the dependence between entries in the proofs of these results requires careful leave-one-out analysis and conditioning arguments. Our results depend only on the signal-to-noise ratio, the sample size, and the spectral properties of the signal matrix.

Original languageEnglish (US)
Pages (from-to)4618-4650
Number of pages33
JournalIEEE Transactions on Information Theory
Volume68
Issue number7
DOIs
StatePublished - Jul 1 2022
Externally publishedYes

Keywords

  • Berry-Esseen
  • Entrywise estimation
  • heteroskedastic
  • singular vectors

ASJC Scopus subject areas

  • Information Systems
  • Computer Science Applications
  • Library and Information Sciences

Fingerprint

Dive into the research topics of 'Entrywise Estimation of Singular Vectors of Low-Rank Matrices With Heteroskedasticity and Dependence'. Together they form a unique fingerprint.

Cite this