Continuity properties and infinite divisibility of stationary distributions of some generalized Ornstein--Uhlenbeck processes

Abstract

Properties of the law μ of the integral ∫0∞c-Nt-\,dYt are studied, where c>1 and \(Nt,Yt),t≥0\ is a bivariate L\'evy process such that \Nt\ and \Yt\ are Poisson processes with parameters a and b, respectively. This is the stationary distribution of some generalized Ornstein--Uhlenbeck process. The law μ is parametrized by c, q and r, where p=1-q-r, q, and r are the normalized L\'evy measure of \(Nt,Yt)\ at the points (1,0), (0,1) and (1,1), respectively. It is shown that, under the condition that p>0 and q>0, μc,q,r is infinitely divisible if and only if r≤ pq. The infinite divisibility of the symmetrization of μ is also characterized. The law μ is either continuous-singular or absolutely continuous, unless r=1. It is shown that if c is in the set of Pisot--Vijayaraghavan numbers, which includes all integers bigger than 1, then μ is continuous-singular under the condition q>0. On the other hand, for Lebesgue almost every c>1, there are positive constants C1 and C2 such that μ is absolutely continuous whenever q≥ C1p≥ C2r. For any c>1 there is a positive constant C3 such that μ is continuous-singular whenever q>0 and \q,r\≤ C3p. Here, if \Nt\ and \Yt\ are independent, then r=0 and q=b/(a+b).