Asymptotic behaviors of subcritical branching killed Brownian motion with drift
Abstract
In this paper, we study asymptotic behaviors of a subcritical branching killed Brownian motion with drift - and offspring distribution \pk:k 0\. Let ζ- be the extinction time of this subcritical branching killed Brownian motion, Mt- the maximal position of all the particles alive at time t and M-:=t 0Mt- the all time maximal position. Let Px be the law of this subcritical branching killed Brownian motion when the initial particle is located at x∈ (0,∞). Under the assumption Σk=1∞ k ( k) pk <∞, we establish the decay rates of Px(ζ->t) and Px(M->y) as t and y tend to ∞ respectively. We also establish the decay rate of Px(Mt->z(t,)) as t∞, where z(t,)=tz- t for ≤ 0 and z(t,)=z for >0. As a consequence, we obtain a Yaglom-type limit theorem.
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