On asymptotic properties of high moments of compound Poisson distribution

Abstract

We study asymptotic behavior of the moments Mk(λ) of the sum X1+…+XNλ, where Nλ follows the Poisson probability distribution with mean value λ and \Xj\ is a family of i.i.d. random variables also independent from Nλ. We obtain an explicit expression for the leading term of Mk(λ) as k∞ and study it in dependence of the asymptotic behavior of λ= λk. In application, we establish a concentration property of maximal vertex degree of large weighted random graphs. Another application is related with a variable that arises in the studies of high moments of large random matrices. Finally, regarding three particular cases of probability distribution of Xj, we comment on the asymptotic behavior of certain combinatorial polynomials, including the Bell polynomials of even partitions.