Diffusion limits at small times for coalescents with a Kingman component

Abstract

We consider standard -coalescents (or coalescents with multiple collisions) with a non-trivial "Kingman part". Equivalently, the driving measure has an atom at 0; (\0\)=c>0. It is known that all such coalescents come down from infinity. Moreover, the number of blocks Nt is asymptotic to v(t) = 2/(ct) as t 0. In the present paper we investigate the second-order asymptotics of Nt in the functional sense at small times. This complements our earlier results on the fluctuations of the number of blocks for a class of regular -coalescents without the Kingman part. In the present setting it turns out that the Kingman part dominates, and the limit process is a Gaussian diffusion, as opposed to the stable limit in our previous work.