Strange shadows of p-balls
Abstract
We prove a large deviations principle for orthogonal projections of the unit ball Bpn of pn onto a random k-dimensional linear subspace of Rn as n∞ in the case 2<p ∞ and for the intersection of Bpn with a random k-dimensional subspace in the case 1 p <2. The corresponding rate function is finite only on Lq-zonoids and their duals, respectively, and given in terms of the maximum entropy over suitable measures generating the Lq-zonoid, where 1p+1q=1. In particular, we obtain that the renormalized projections/sections almost surely tend to a k-dimensional Euclidean ball of certain radius. Moreover, we identify the asymptotic probability that the random orthogonal projection remains within a ball of smaller radius. As a byproduct we obtain an interesting inequality for the Gamma function.
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