Gaussian fluctuations for high-dimensional random projections of pn-balls

Abstract

In this paper, we study high-dimensional random projections of pn-balls. More precisely, for any n∈ N let En be a random subspace of dimension kn∈\1,…,n\ and Xn be a random point in the unit ball of pn. Our work provides a description of the Gaussian fluctuations of the Euclidean norm \|PEnXn\|2 of random orthogonal projections of Xn onto En. In particular, under the condition that kn∞ it is shown that these random variables satisfy a central limit theorem, as the space dimension n tends to infinity. Moreover, if kn∞ fast enough, we provide a Berry-Esseen bound on the rate of convergence in the central limit theorem. At the end we provide a discussion of the large deviations counterpart to our central limit theorem.