Maximal Displacement of Critical Branching Symmetric Stable Processes

Abstract

We consider a critical continuous-time branching process (a Yule process) in which the individuals independently execute symmetric α-stable random motions on the real line starting at their birth points. Because the branching process is critical, it will eventually die out, and so there is a well-defined maximal location M ever visited by an individual particle of the process. We prove that the distribution of M satisfies the asymptotic relation P\M≥ x \ (2/α)1/2x-α /2 as x → ∞.