The Mittag-Leffler process and a scaling limit for the block counting process of the Bolthausen-Sznitman coalescent

Abstract

The Mittag-Leffler process X=(Xt)t 0 is introduced. This Markov process has the property that its marginal random variables Xt are Mittag-Leffler distributed with parameter e-t, t∈ [0,∞), and the semigroup (Tt)t 0 of X satisfies Ttf(x)= E(f(xe-tXt)) for all x 0 and all bounded measurable functions f:[0,∞) R. Further characteristics of the process X are derived, for example an explicit formula for the joint moments of its finite dimensional distributions. The main result states that the block counting process of the Bolthausen-Sznitman n-coalescent, properly scaled, converges in the Skorohod topology to the Mittag-Leffler process X as the sample size n tends to infinity.