Random increasing plane trees: asymptotic enumeration of vertices by distance from leaves

Abstract

We prove that for any fixed k, the probability that a random vertex of a random increasing plane tree is of rank k, that is, the probability that a random vertex is at distance k from the leaves, converges to a constant ck as the size n of the tree goes to infinity. blue We prove that 1-Σj k ck<3k+1(2k+1)!, so that the tail of the limiting rank distribution is super-exponentially narrow. We prove that the latter property holds uniformly for all finite n as well. More generally, we prove that the ranks of a finite uniformly random set of vertices are asymptotically independent, each with distribution \ck\. We compute the exact value of ck for 0≤ k≤ 3, demonstrating that the limiting expected fraction of vertices with rank 3 is 0.9997…. We show that with probability 1-n-0.99 the highest rank of a vertex in the tree is sandwiched between (1-) n / n and (1.5+) n/ n, blue and that this rank is asymptotic to n/ n with probability 1-o(1).