In this paper we consider diffusions on the half line (0, ∞) such that the expectation of the arrival time at the origin is uniformly bounded in the initial point. This implies that there is a well defined diffusion process starting from infinity, which takes finite values at positive times. We study the behaviour of hitting times of large barriers and in a dual way, the behaviour of the process starting at infinity for small time. In particular we prove that the process coming down from infinity is in small time governed by a specific deterministic function. Suitably normalized fluctuations of the hitting times are asymptotically Gaussian. We also derive the tail of the distribution of the hitting time of the origin and a Yaglom limit for ...
AbstractLet (Xt)t≥0 be a regular one-dimensional diffusion that models a biological population. If o...
For V a random càd-làg process, we call diffusion in the random medium V the formal solution of thes...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...
In this paper we consider diffusions on the half line (0, ∞) such that the expectation of the arriva...
Limit theorems constitute a classical and important field in probability theory. In several applicat...
The effect of small noise in a smooth dynamical system is negligible on any finite time interval; in...
KeywordsLet X(t) be a time-homogeneous one-dimensional diffusion process defined in I , starting at...
What happens when a continuously evolving stochastic process is interrupted with large changes at ra...
AbstractWe consider the heavy-traffic approximation to the GI/M/s queueing system in the Halfin–Whit...
We consider the heavy-traffic approximation to the GI/M/s queueing system in the Halfin-Whitt regime...
We study the properties of anomalous diffusion on finite intervals. The process studied due to the p...
AbstractWe consider a diffusion process on D⊂Rd, which upon hitting ∂D, is redistributed in D accord...
This paper studies, in dimensions greater than two, stationary diffusion processes in random environ...
We deal with the qualitative behaviour of the first-passage-time density of a one-dimensional dif...
We present a constructive probabilistic proof of the fact that if B = (Bt)t≥0 is standard Brownian m...
AbstractLet (Xt)t≥0 be a regular one-dimensional diffusion that models a biological population. If o...
For V a random càd-làg process, we call diffusion in the random medium V the formal solution of thes...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...
In this paper we consider diffusions on the half line (0, ∞) such that the expectation of the arriva...
Limit theorems constitute a classical and important field in probability theory. In several applicat...
The effect of small noise in a smooth dynamical system is negligible on any finite time interval; in...
KeywordsLet X(t) be a time-homogeneous one-dimensional diffusion process defined in I , starting at...
What happens when a continuously evolving stochastic process is interrupted with large changes at ra...
AbstractWe consider the heavy-traffic approximation to the GI/M/s queueing system in the Halfin–Whit...
We consider the heavy-traffic approximation to the GI/M/s queueing system in the Halfin-Whitt regime...
We study the properties of anomalous diffusion on finite intervals. The process studied due to the p...
AbstractWe consider a diffusion process on D⊂Rd, which upon hitting ∂D, is redistributed in D accord...
This paper studies, in dimensions greater than two, stationary diffusion processes in random environ...
We deal with the qualitative behaviour of the first-passage-time density of a one-dimensional dif...
We present a constructive probabilistic proof of the fact that if B = (Bt)t≥0 is standard Brownian m...
AbstractLet (Xt)t≥0 be a regular one-dimensional diffusion that models a biological population. If o...
For V a random càd-làg process, we call diffusion in the random medium V the formal solution of thes...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...