English

First exit and Dirichlet problem for the nonisotropic tempered $\alpha$-stable processes

Probability 2019-01-11 v1

Abstract

This paper discusses the first exit and Dirichlet problems of the nonisotropic tempered α\alpha-stable process XtX_t. The upper bounds of all moments of the first exit position XτD\left|X_{\tau_D}\right| and the first exit time τD\tau_D are firstly obtained. It is found that the probability density function of XτD\left|X_{\tau_D}\right| or τD\tau_D exponentially decays with the increase of XτD\left|X_{\tau_D}\right| or τD\tau_D, and E[τD]E[XτD]\mathrm{E}\left[\tau_D\right]\sim \left|\mathrm{E}\left[X_{\tau_D}\right]\right|,\ E[τD]E[XτDE[XτD]2]\mathrm{E}\left[\tau_D\right]\sim\mathrm{E}\left[\left|X_{\tau_D}-\mathrm{E}\left[X_{\tau_D}\right]\right|^2\right] . Since Δmα/2,λ\mathrm{\Delta}^{\alpha/2,\lambda}_m is the infinitesimal generator of the anisotropic tempered stable process, we obtain the Feynman-Kac representation of the Dirichlet problem with the operator Δmα/2,λ\mathrm{\Delta}^{\alpha/2,\lambda}_m. Therefore, averaging the generated trajectories of the stochastic process leads to the solution of the Dirichlet problem, which is also verified by numerical experiments.

Keywords

Cite

@article{arxiv.1901.03204,
  title  = {First exit and Dirichlet problem for the nonisotropic tempered $\alpha$-stable processes},
  author = {Xing Liu and Weihua Deng},
  journal= {arXiv preprint arXiv:1901.03204},
  year   = {2019}
}

Comments

23 pages, 5 figures

R2 v1 2026-06-23T07:08:09.689Z