Persistence problems for additive functionals of one-dimensional Markov processes

Abstract

In this article, we consider additive functionals ζt = ∫0t f(Xs)d s of a c\`adl\`ag Markov process (Xt)t≥ 0 on R. Under some general conditions on the process (Xt)t≥ 0 and on the function f, we show that the persistence probabilities verify P(ζs < z for all s≤ t ) V(z) (t) t-θ as t∞, for some (explicit) V(·), some slowly varying function (·) and some θ∈ (0,1). This extends results in the literature, which mostly focused on the case of a self-similar process (Xt)t≥ 0 (such as Brownian motion or skew-Bessel process) with a homogeneous functional f (namely a pure power, possibly asymmetric). In a nutshell, we are able to deal with processes which are only asymptotically self-similar and functionals which are only asymptotically homogeneous. Our results rely on an excursion decomposition of (Xt)t≥ 0, together with a Wiener--Hopf decomposition of an auxiliary (bivariate) L\'evy process, with a probabilistic point of view. This provides an interpretation for the asymptotic behavior of the persistence probabilities, and in particular for the exponent θ, which we write as θ = β, with β the scaling exponent of the local time of (Xt)t≥ 0 at level 0 and the (asymptotic) positivity parameter of the auxiliary L\'evy process.