English

Efficient Estimation of Linear Functionals of Principal Components

Statistics Theory 2019-01-21 v4 Statistics Theory

Abstract

We study principal component analysis (PCA) for mean zero i.i.d. Gaussian observations X1,,XnX_1,\dots, X_n in a separable Hilbert space H\mathbb{H} with unknown covariance operator Σ.\Sigma. The complexity of the problem is characterized by its effective rank r(Σ):=tr(Σ)Σ,{\bf r}(\Sigma):= \frac{{\rm tr}(\Sigma)}{\|\Sigma\|}, where tr(Σ){\rm tr}(\Sigma) denotes the trace of Σ\Sigma and Σ\|\Sigma\| denotes its operator norm. We develop a method of bias reduction in the problem of estimation of linear functionals of eigenvectors of Σ.\Sigma. Under the assumption that r(Σ)=o(n),{\bf r}(\Sigma)=o(n), we establish the asymptotic normality and asymptotic properties of the risk of the resulting estimators and prove matching minimax lower bounds, showing their semi-parametric optimality.

Keywords

Cite

@article{arxiv.1708.07642,
  title  = {Efficient Estimation of Linear Functionals of Principal Components},
  author = {Vladimir Koltchinskii and Matthias Löffler and Richard Nickl},
  journal= {arXiv preprint arXiv:1708.07642},
  year   = {2019}
}

Comments

48 pages, to appear in Annals of Statistics

R2 v1 2026-06-22T21:23:20.585Z