Asymptotic expansion for additive measure of branching Brownian motion

Abstract

Let N(t) be the collection of particles alive at time t in a branching Brownian motion in Rd, and for u∈ N(t), let Xu(t) be the position of particle u at time t. For θ∈ Rd, we define the additive measures of the branching Brownian motion byμtθ (dx):= e-(1+θ22)tΣu∈ N(t) e-θ · Xu(t) δ(Xu(t)+θ t)(dx). In this paper, under some conditions on the offspring distribution, we give asymptotic expansions of arbitrary order for μtθ ((a, b]) and μtθ ((-∞, a]) for θ∈ Rd with θ <2. These expansions sharpen the asymptotic results of Asmussen and Kaplan (1976) and Kang (1999), and are analogs of the expansions in Gao and Liu (2021) and R\'ev\'esz, Rosen and Shi (2005) for branching Wiener processes (a particular class of branching random walks) corresponding to θ=0.

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