Approximating Lp unit balls via random sampling

Abstract

Let X be an isotropic random vector in Rd that satisfies that for every v ∈ Sd-1, \|<X,v>\|Lq ≤ L \|<X,v>\|Lp for some q ≥ 2p. We show that for 0<<1, a set of N = c(p,q,) d random points, selected independently according to X, can be used to construct a 1 approximation of the Lp unit ball endowed on Rd by X. Moreover, c(p,q,) ≤ cp -2(2/); when q=2p the approximation is achieved with probability at least 1-2(-cN 2/2(2/)) and if q is much larger than p---say, q=4p, the approximation is achieved with probability at least 1-2(-cN 2). In particular, when X is a log-concave random vector, this estimate improves the previous state-of-the-art---that N=c(p,) dp/2 d random points are enough, and that the approximation is valid with constant probability.