On the size of the block of 1 for -coalescents with dust

Abstract

We study the frequency process f1 of the block of 1 for a -coalescent with dust. If stays infinite, f1 is a jump-hold process which can be expressed as a sum of broken parts from a stick-breaking procedure with uncorrelated, but in general non-independent, stick lengths with common mean. For Dirac--coalescents with =δp, p∈[12,1), f1 is not Markovian, whereas its jump chain is Markovian. For simple -coalescents the distribution of f1 at its first jump, the asymptotic frequency of the minimal clade of 1, is expressed via conditionally independent shifted geometric distributions.