First exit and Dirichlet problem for the nonisotropic tempered α-stable processes

Abstract

This paper discusses the first exit and Dirichlet problems of the nonisotropic tempered α-stable process Xt. The upper bounds of all moments of the first exit position |XτD| and the first exit time τD are firstly obtained. It is found that the probability density function of |XτD| or τD exponentially decays with the increase of |XτD| or τD, and E[τD] |E[XτD]|,\ E[τD][|XτD-E[XτD]|2] . Since α/2,λm is the infinitesimal generator of the anisotropic tempered stable process, we obtain the Feynman-Kac representation of the Dirichlet problem with the operator α/2,λm. Therefore, averaging the generated trajectories of the stochastic process leads to the solution of the Dirichlet problem, which is also verified by numerical experiments.