Logarithmic L\'evy process directed by Poisson subordinator

Abstract

Let \L(t),t≥ 0\ be a L\'evy process with representative random variable L(1) defined by the infinitely divisible logarithmic series distribution. We study here the transition probability and L\'evy measure of this process. We also define two subordinated processes. The first one, Y(t), is a Negative-Binomial process X(t) directed by Gamma process. The second process, Z(t), is a Logarithmic L\'evy process L(t) directed by Poisson process. For them, we prove that the Bernstein functions of the processes L(t) and Y(t) contain the iterated logarithmic function. In addition, the L\'evy measure of the subordinated process Z(t) is a shifted L\'evy measure of the Negative-Binomial process X(t). We compare the properties of these processes, knowing that the total masses of corresponding L\'evy measures are equal.