On the self-decomposability of the Fr\'echet distribution

Abstract

Let \t, \, t 0\ be the Gamma subordinator. Using a moment identification due to Bertoin-Yor (2002), we observe that for every t > 0 and α∈ (0,1) the random variable t-α is distributed as the exponential functional of some spectrally negative L\'evy process. This entails that all size-biased samplings of Fr\'echet distributions are self-decomposable and that the extreme value distribution F is infinitely divisible if and only if ∈ (0,1), solving problems raised by Steutel (1973) and Bondesson (1992). We also review different analytical and probabilistic interpretations of the infinite divisibility of t-α for t,α > 0.