Exact Rosenthal-type bounds

Abstract

It is shown that, for any given p5, A>0 and B>0, the exact upper bound on E|Σ Xi|p over all independent zero-mean random variables (r.v.'s) X1,…,Xn such that ΣEXi2=B and ΣE|Xi|p=A equals cpE|λ-λ|p, where (λ ,c)∈(0,∞)2 is the unique solution to the system of equations cpλ=A and c2λ=B, and λ is a Poisson r.v. with mean λ. In fact, a more general result is obtained, as well as other related ones. As a tool used in the proof, a calculus of variations of moments of infinitely divisible distributions with respect to variations of the L\'evy characteristics is developed.