On Low-Dimensional Projections of High-Dimensional Distributions

Abstract

Let P be a probability distribution on q-dimensional space. The so-called Diaconis-Freedman effect means that for a fixed dimension d << q, most d-dimensional projections of P look like a scale mixture of spherically symmetric Gaussian distributions. The present paper provides necessary and sufficient conditions for this phenomenon in a suitable asymptotic framework with increasing dimension q. It turns out, that the conditions formulated by Diaconis and Freedman (1984) are not only sufficient but necessary as well. Moreover, letting P be the empirical distribution of n independent random vectors with distribution P, we investigate the behavior of the empirical process n(P - P) under random projections, conditional on P.