Evaluating moments of length of Pitman partition

Abstract

The Pitman sampling formula has been intensively studied as a distribution of random partitions. One of the objects of interest is the length K (= Kn,θ,α) of a random partition that follows the Pitman sampling formula, where n∈N, α∈(0,∞) and θ > -α are parameters. This paper presents asymptotic evaluations of its r-th moment E[Kr] (r=1,2,…) under two asymptotic regimes. In particular, the goals of this study are to provide a finer approximate evaluation of E[Kr] as n∞ than has previously been developed and to provide an approximate evaluation of E[Kr] as the parameters n and θ simultaneously tend to infinity with θ/n 0. The results presented in this paper will provide a more accurate understanding of the asymptotic behavior of K.