First-passage and first-exit times of a Bessel-like stochastic process

Abstract

We study a stochastic process Xt related to the Bessel and the Rayleigh processes, with various applications in physics, chemistry, biology, economics, finance and other fields. The stochastic differential equation is dXt = (nD/Xt) dt + 2D dWt, where Wt is the Wiener process. Due to the singularity of the drift term for Xt = 0, different natures of boundary at the origin arise depending on the real parameter n: entrance, exit, and regular. For each of them we calculate analytically and numerically the probability density functions of first-passage times or first-exit times. Nontrivial behaviour is observed in the case of a regular boundary.