Lah distribution: Stirling numbers, records on compositions, and convex hulls of high-dimensional random walks

Abstract: Let ξ 1 , ξ 2 , . . . be a sequence of independent copies of a random vector in R d having an absolutely continuous distribution. Consider a random walk S i := ξ 1 + • • • + ξ i , and let C n,d := conv(0, S 1 , S 2 , . . . , S n ) be the convex hull of the first n + 1 points it has visited. The polytope C n,d is called k-neighborly if for every indices 0We study the probability that C n,d is k-neighborly in various high-dimensional asymptotic regimes, i.e. when n, d, and possibly also k diverge to ∞. There is … Show more