The joint fluctuations of the lengths of the Beta(2-α, α)-coalescents

Abstract

We consider Beta(2-α, α)-coalescents with parameter range 1 <α<2 starting from n leaves. The length (n)r of order r in the n-Beta(2-α, α)-coalescent tree is defined as the sum of the lengths of all branches that carry a subtree with r leaves. We show that for any s ∈ N the vector of suitably centered and rescaled lengths of orders 1 r s converges in distribution to a multivariate stable distribution as the number of leaves tends to infinity.