Random polytopes obtained by matrices with heavy tailed entries

Abstract

Let be an N× n random matrix with independent entries and such that in each row entries are i.i.d. Assume also that the entries are symmetric, have unit variances, and satisfy a small ball probabilistic estimate uniformly. We investigate properties of the corresponding random polytope * B1N in R (the absolute convex hull of rows of ). In particular, we show that B1N ⊃ b-1 ( B∞n (N/n)\, B2n ). where b depends only on parameters in small ball inequality. This extends results of LPRT and recent results of KKR. This inclusion is equivalent to so-called 1-quotient property and plays an important role in compressive sensing (see KKR and references therein).