The extremal point process of branching Brownian motion in Rd
Abstract
We consider a branching Brownian motion in Rd with d ≥ 1 in which the position Xt(u)∈ Rd of a particle u at time t can be encoded by its direction θ(u)t ∈ Sd-1 and its distance R(u)t to 0. We prove that the extremal point process Σ δθ(u)t, R(u)t - mt(d) (where the sum is over all particles alive at time t and m(d)t is an explicit centring term) converges in distribution to a randomly shifted decorated Poisson point process on Sd-1 × R. More precisely, the so-called clan-leaders form a Cox process with intensity proportional to D∞(θ) e-2r ~d r ~d θ , where D∞(θ) is the limit of the derivative martingale in direction θ and the decorations are i.i.d. copies of the decoration process of the standard one-dimensional branching Brownian motion. This proves a conjecture of Stasi\'nski, Berestycki and Mallein (Ann. Inst. H. Poincar\'e 57:1786--1810, 2021), and builds on that paper and on Kim, Lubetzky and Zeitouni (arXiv:2104.07698).
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