On the graph-density of random 0/1-polytopes

Let X_{d,n} be an n-element subset of {0,1}^d chosen uniformly at random, and denote by P_{d,n} := conv X_{d,n} its convex hull. Let D_{d,n} be the density of the graph of P_{d,n} (i.e., the number of one-dimensional faces of P_{d,n} divided by n(n-1)/2). Our main result is that, for any function n(d), the expected value of D_{d,n(d)} converges (with d tending to infinity) to one if, for some arbitrary e > 0, n(d) = (\sqrt{2}+e)^d holds for all large d.