Efficient Estimation of Linear Functionals of Principal Components

Abstract

We study principal component analysis (PCA) for mean zero i.i.d. Gaussian observations X1,…, Xn in a separable Hilbert space H with unknown covariance operator . The complexity of the problem is characterized by its effective rank r():= tr()\|\|, where tr() denotes the trace of and \|\| denotes its operator norm. We develop a method of bias reduction in the problem of estimation of linear functionals of eigenvectors of . Under the assumption that r()=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.