The range of a self-similar additive gamma process is a scale invariant Poisson point process

Abstract

It is shown that for a non-decreasing self-similar stochastic process T with independent increments, the range of T forms a Poisson point process with σ-finite intensity if and only if the one-dimensional distribution of T(1) is of the gamma type. This follows from a general hold-jump description of such processes T, and implies the known result that the spacings between consecutive points of a scale invariant Poisson point process, with intensity θ x-1 dx, are the points of another scale invariant Poisson point process with the same intensity.