Asymptotic behaviors of subcritical branching killed Brownian motion with drift

TL;DR

This paper analyzes the long-term behavior of a subcritical branching Brownian motion with drift, focusing on extinction times and maximal particle positions, and establishes decay rates and a Yaglom-type limit theorem.

Contribution

It provides new asymptotic decay rates for extinction and maximal position probabilities in subcritical branching Brownian motion with drift, under specific offspring distribution conditions.

Findings

Decay rates for extinction time probabilities as time tends to infinity.

Decay rates for maximal position probabilities as position tends to infinity.

A Yaglom-type limit theorem for the process.

Abstract

In this paper, we study asymptotic behaviors of a subcritical branching killed Brownian motion with drift $-\rho$ and offspring distribution $\{p_k:k\ge 0\}$. Let $\widetilde{\zeta}^{-\rho}$ be the extinction time of this subcritical branching killed Brownian motion, $\widetilde{M}_t^{-\rho}$ the maximal position of all the particles alive at time $t$ and $\widetilde{M}^{-\rho}:=\max_{t\ge 0}\widetilde{M}_t^{-\rho}$ the all time maximal position. Let $\mathbb{P}_x$ be the law of this subcritical branching killed Brownian motion when the initial particle is located at $x\in (0,\infty)$. Under the assumption $\sum_{k=1}^\infty k (\log k) p_k <\infty$, we establish the decay rates of $\mathbb{P}_x(\widetilde{\zeta}^{-\rho}>t)$ and $\mathbb{P}_x(\widetilde{M}^{-\rho}>y)$ as $t$ and $y$ tend to $\infty$ respectively. We also establish the decay rate of $\mathbb{P}_x(\widetilde{M}_t^{-\rho}>z(t,\rho))$ as $t\to\infty$, where $z(t,\rho)=\sqrt{t}z-\rho t$ for $\rho\leq 0$ and $z(t,\rho)=z$ for $\rho>0$. As a consequence, we obtain a Yaglom-type limit theorem.