Half-space depth of log-concave probability measures

Abstract

Given a probability measure μ on Rn, Tukey's half-space depth is defined for any x∈ Rn by μ (x)=∈f\μ (H):H∈ H(x)\, where H(x) is the set of all half-spaces H of Rn containing x. We show that if μ is log-concave then e-c1n≤ ∫Rnμ (x)\,dμ(x) ≤ e-c2n/Lμ2 where Lμ is the isotropic constant of μ and c1,c2>0 are absolute constants. The proofs combine large deviations techniques with a number of facts from the theory of Lq-centroid bodies of log-concave probability measures. The same ideas lead to general estimates for the expected measure of random polytopes whose vertices have a log-concave distribution.