Abstract
The paper is concerned with asymptotic properties of the principal components analysis of functional data. The currently available results assume the existence of the fourth moment. We develop analogous results in a setting which does not require this assumption. Instead, we assume that the observed functions are regularly varying. We derive the asymptotic distribution of the sample covariance operator and of the sample functional principal components. We obtain a number of results on the convergence of moments and almost sure convergence. We apply the new theory to establish the consistency of the regression operator in a functional linear model.
Citation
Piotr Kokoszka. Stilian Stoev. Qian Xiong. "Principal components analysis of regularly varying functions." Bernoulli 25 (4B) 3864 - 3882, November 2019. https://doi.org/10.3150/19-BEJ1113
Information