Threshold for the expected measure of the convex hull of random points with independent coordinates

Abstract

Let μ be an even Borel probability measure on R. For every N>n consider N independent random vectors X1,… ,XN in Rn, with independent coordinates having distribution μ . We establish a sharp threshold for the product measure μn of the random polytope KN:= conv\X1,…,XN\ in Rn under the assumption that the Legendre transform μ of the logarithmic moment generating function of μ satisfies the condition x x- μ ([x,∞ ))μ(x)=1, where x=\x∈R μ([x,∞))>0\. An application is a sharp threshold for the case of the product measure pn=p n, p≥ 1 with density (2γp)-n(-\|x\|pp), where \|·\|p is the pn-norm and γp=(1+1/p).