Persistence problems for additive functionals of one-dimensional Markov processes

Abstract: In this article, we consider additive functionals $\zeta_t = \int_0^t f(X_s)\mathrm{d} s$ of a c`adl`ag Markov process $(X_t){t\geq 0}$ on $\mathbb{R}$. Under some general conditions on the process $(X_t){t\geq 0}$ and on the function $f$, we show that the persistence probabilities verify $\mathbb{P}(\zeta_s < z \text{ for all } s\leq t ) \sim \mathcal{V}(z) \varsigma(t) t^{-\theta}$ as $t\to\infty$, for some (explicit) $\mathcal{V}(\cdot)$, some slowly varying function $\varsigma(\cdot)$ and some $\theta\in (0,1)$. This extends results in the literature, which mostly focused on the case of a self-similar process $(X_t){t\geq 0}$ (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 $(X_t){t\geq 0}$, 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 $\theta$, which we write as $\theta = \rho \beta$, with $\beta$ the scaling exponent of the local time of $(X_{t})_{t\geq 0}$ at level $0$ and $\rho$ the (asymptotic) positivity parameter of the auxiliary L\'evy process.