Almost periodic stationary processes

Abstract

We derive a necessary and sufficient condition for stochastic processes to have almost periodic finite dimensional distributions; in particular, we obtain characterizations for infinitely divisible processes to be almost periodic in terms of their characteristic triplets. Furthermore, we derive conditions when the process (Xt)t∈ defined by the stochastic integral Xt:= ∫d f(t,s) dL(s) is almost periodic stationary and also when it is almost periodic in probability, where f(t,·)∈ L1(d,) L2(d,) is deterministic and L is a L\'evy basis. Moreover, we discuss almost periodic Ornstein-Uhlenbeck-type processes, and obtain a central limit theorem for m-dependent processes with almost periodic finite dimensional distributions.