Asymptotic expansion for branching killed Brownian motion with drift

Abstract

Let Zt(0,∞) be the point process formed by the positions of all particles alive at time t in a branching Brownian motion with drift and killed upon reaching 0. We study the asymptotic expansions of Zt(0,∞)(A) for A= (a,b) and A=(a,∞) under the assumption that Σk=1∞ k( k)1+λ pk <∞ for large λ in the regime of θ ∈ [0,2). These results extend and sharpen the results of Louidor and Saglietti [J. Stat. Phys, 2020] and Kesten [Stochastic Process. Appl., 1978].