Total variation bound for Hadwiger's functional using Stein's method

Abstract

Let K be a convex body in Rd. Let XK be a d-dimensional random vector distributed according to the Hadwiger-Wills density μK associated with K, defined as μK(x)=ce-π dist2(x,K), x∈ Rd. Finally, let the information content HK be defined as HK= dist2(XK,K). The goal of this paper is to study the fluctuations of HK around its expectation as the dimension d go to infinity. Relying on Stein's method and Brascamp-Lieb inequality, we compute an explicit bound for the total variation distance between HK and its Gaussian counterpart.