Cotype of random polytopes

Abstract

For N≥ n, let PN,n be a random polytope in Rn with vertices Xi, 1≤ i≤ N, where X1,…,XN are i.i.d standard Gaussian vectors in Rn. Random polytopes PN,n, as well as their duals, are classical objects of interest in high-dimensional convex geometry and local Banach space theory. In this paper, we provide a dimension-independent bound on the cotype of the corresponding normed space ( Rn,\|·\|PN,n), generated by PN,n. Let K'≥ K>1, and assume that K'≥ Nn≥ K. We show that with probability 1-o(1), for any k≥ 1, and any collection y1,…,yk of vectors in Rn, Eσ\,\|Σi=1k σi yi\|PN,nq ≥ 1CqqΣi=1k \|yi\|PN,nq, where σ=(σ1,…,σk) is a vector of random signs, and where q∈ [2,∞) and Cq∈[1,∞) may only depend on K,K'. We discuss the result in context of infinite-dimensional Banach spaces.

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