Tails of extinction time and maximal displacement for critical branching killed L\'{e}vy process

TL;DR

This paper analyzes the asymptotic tail behaviors of extinction times and maximal displacement in a critical branching Lévy process killed at zero, revealing decay rates and scaling limits under certain stable offspring distribution assumptions.

Contribution

It provides new decay rate estimates and scaling limit descriptions for the tail probabilities and maximal displacement in critical branching Lévy processes with stable offspring distributions.

Findings

Decay rates for survival probabilities are established.

Tail probabilities for maximal displacement are characterized.

Scaling limits involve super killed Brownian motion.

Abstract

In this paper, we study asymptotic behaviors of the tails of extinction time and maximal displacement of a critical branching killed L\'{e}vy process $(Z_t^{(0,\infty)})_{t\ge 0}$ in $\mathbb{R}$, in which all particles (and their descendants) are killed upon exiting $(0, \infty)$. Let $\zeta^{(0,\infty)}$ and $M_t^{(0,\infty)}$ be the extinction time and maximal position of all the particles alive at time $t$ of this branching killed L\'{e}vy process and define $M^{(0,\infty)}: = \sup_{t\geq 0} M_t^{(0,\infty)}$. Under the assumption that the offspring distribution belongs to the domain of attraction of an $\alpha$-stable distribution, $\alpha\in (1, 2]$, and some moment conditions on the spatial motion, we give the decay rates of the survival probabilities $$ \mathbb{P}_{y}(\zeta^{(0,\infty)}>t), \quad \mathbb{P}_{\sqrt{t}y}(\zeta^{(0,\infty)}>t) $$ and the tail probabilities $$ \mathbb{P}_{y}(M^{(0,\infty)}\geq x), \quad \mathbb{P}_{xy}(M^{(0,\infty)}\geq x). $$ We also study the scaling limits of $M_t^{(0,\infty)}$ and the point process $Z_t^{(0,\infty)}$ under $\mathbb{P}_{\sqrt{t}y}(\cdot |\zeta^{(0,\infty)}>t)$ and $\mathbb{P}_y(\cdot |\zeta^{(0,\infty)}>t)$. The scaling limits under $\mathbb{P}_{\sqrt{t}y}(\cdot |\zeta^{(0,\infty)}>t)$ are represented in terms of super killed Brownian motion.