The asymptotic distribution of the length of Beta-coalescent trees

Abstract

We derive the asymptotic distribution of the total length Ln of a Beta(2-α,α)-coalescent tree for 1<α<2, starting from n individuals. There are two regimes: If α1/2(1+5), then Ln suitably rescaled has a stable limit distribution of index α. Otherwise Ln just has to be shifted by a constant (depending on n) to get convergence to a nondegenerate limit distribution. As a consequence, we obtain the limit distribution of the number Sn of segregation sites. These are points (mutations), which are placed on the tree's branches according to a Poisson point process with constant rate.