Depth properties of scaled attachment random recursive trees

Abstract

We study depth properties of a general class of random recursive trees where each node i attaches to the random node iXi and X0, ..., Xn is a sequence of i.i.d. random variables taking values in [0,1). We call such trees scaled attachment random recursive trees (SARRT). We prove that the typical depth Dn, the maximum depth (or height) Hn and the minimum depth Mn of a SARRT are asymptotically given by Dn μ-1 n, Hn α n and Mn α n where μ, α and α are constants depending only on the distribution of X0 whenever X0 has a density. In particular, this gives a new elementary proof for the height of uniform random recursive trees Hn e n that does not use branching random walks.