A Cram\'er--Wold device for infinite divisibility of Zd-valued distributions

Abstract

We show that a Cram\'er--Wold device holds for infinite divisibility of Zd-valued distributions, i.e. that the distribution of a Zd-valued random vector X is infinitely divisible if and only if L(aT X) is infinitely divisible for all a∈ Rd, and that this in turn is equivalent to infinite divisibility of L(aT X) for all a∈ N0d. A key tool for proving this is a L\'evy--Khintchine type representation with a signed L\'evy measure for the characteristic function of a Zd-valued distribution, provided the characteristic function is zero-free.