The internal branch lengths of the Kingman coalescent

Abstract

In the Kingman coalescent tree the length of order r is defined as the sum of the lengths of all branches that support r leaves. For r=1 these branches are external, while for r2 they are internal and carry a subtree with r leaves. In this paper we prove that for any s∈N the vector of rescaled lengths of orders 1 r s converges to the multivariate standard normal distribution as the number of leaves of the Kingman coalescent tends to infinity. To this end we use a coupling argument which shows that for any r2 the (internal) length of order r behaves asymptotically in the same way as the length of order 1 (i.e., the external length).