Distribution of external branch lengths in Yule trees

Abstract

The Yule branching process is a classical model for the random generation of gene tree topologies in population genetics. It generates binary ranked trees -- also called "histories" -- with a finite number n of leaves. We study the lengths 1 > 2 > ... > k > ... of the external branches of a Yule generated random history of size n, where the length of an external branch is defined as the rank of its parent node. When n → ∞, we show that the random variable k, once rescaled as n-kn/2, follows a -distribution with 2k degrees of freedom, with mean E(k) n and variance V(k) n (k-π k216k 2kk2). Our results contribute to the study of the combinatorial features of Yule generated gene trees, in which external branches are associated with singleton mutations affecting individual gene copies.