Ergodic aspects of some Ornstein-Uhlenbeck type processes related to L\'evy processes

Abstract

This work concerns the Ornstein-Uhlenbeck type process associated to a positive self-similar Markov process (X(t))t≥ 0 which drifts to ∞, namely U(t):= e-tX( et-1). We point out that U is always a (topologically) recurrent Markov process and identify its invariant measure in terms of the law of the exponential functional I := ∫0∞ (s) ds, where is the dual of the real-valued L\'evy process related to X by the Lamperti transformation. This invariant measure is infinite (i.e. U is null-recurrent) if and only if 1 ∈ L1(P). In that case, we determine the family of L\'evy processes for which U fulfills the conclusions of the Darling-Kac theorem. Our approach relies crucially on another generalized Ornstein-Uhlenbeck process that can be associated to the L\'evy process , namely V(t) := (t)(∫0t (-s) ds +V(0)), and properties of time-substitutions based on additive functionals.