Improved Rates of Bootstrap Approximation for the Operator Norm: A Coordinate-Free Approach

Abstract

Let =1nΣi=1n Xi Xi denote the sample covariance operator of centered i.i.d.~observations X1,…,Xn in a real separable Hilbert space, and let =E(X1 X1). The focus of this paper is to understand how well the bootstrap can approximate the distribution of the operator norm error n\|-\|op, in settings where the eigenvalues of decay as λj() j-2β for some fixed parameter β>1/2. Our main result shows that the bootstrap can approximate the distribution of n\|-\|op at a rate of order n-β-1/22β+4+ε with respect to the Kolmogorov metric, for any fixed ε>0. In particular, this shows that the bootstrap can achieve near n-1/2 rates in the regime of large β -- which substantially improves on previous near n-1/6 rates in the same regime. In addition to obtaining faster rates, our analysis leverages a fundamentally different perspective based on coordinate-free techniques. Moreover, our result holds in greater generality, and we propose a model that is compatible with both elliptical and Marcenko-Pastur models in high-dimensional Euclidean spaces, which may be of independent interest.