Escape from bounded domains driven by multi-variate α-stable noises

Abstract

In this paper we provide an analysis of a mean first passage time problem of a random walker subject to a bi-variate α-stable L\'evy type noise from a 2-dimensional disk. For an appropriate choice of parameters the mean first passage time reveals non-trivial, non-monotonous dependence on the stability index α describing jumps' length asymptotics both for spherical and Cartesian L\'evy flights. Finally, we study escape from d-dimensional hyper-sphere showing that d-dimensional escape process can be used to discriminate between various types of multi-variate α-stable noises, especially spherical and Cartesian L\'evy flights.