The limiting behavior of some infinitely divisible exponential dispersion models

Abstract

Consider an exponential dispersion model (EDM) generated by a probability μ on [0,∞ ) which is infinitely divisible with an unbounded L\'evy measure . The Jorgensen set (i.e., the dispersion parameter space) is then R+, in which case the EDM is characterized by two parameters: θ 0 the natural parameter of the associated natural exponential family and the Jorgensen (or dispersion) parameter t. Denote by EDM(θ 0,t) the corresponding distribution and let Yt is a r.v. with distribution EDM(θ0,t). Then if ((x,∞ )) - x around zero we prove that the limiting law F0 of Yt-t as t→ 0 is of a Pareto type (not depending on θ0) with the form F0(u)=0 for u<1 and 1-u- for u≥ 1. Such a result enables an approximation of the distribution of Yt for relatively small values of the dispersion parameter of the corresponding EDM. Illustrative examples are provided.