The number of particles at sublinear distances from the tip in branching Brownian motion

Abstract

Consider a branching Brownian motion (BBM). It is well known Bramson1983ConvergenceOS, Lalley1987ACL that the rightmost particle is located near \( mt = 2 t - 322 t \). Let N(t,x) be the set of particles within distance x from mt, where x = o(t) grows with t. We prove that \(\#N(t,x)/π-1/2xexmt/t e-x2/(2t) \) converges in probability to Z∞, the limit of the so-called derivative martingale, and that, for \( x = O( t1/3) \), the convergence cannot be strengthened to an almost sure result. Moreover, we prove that the asymptotic overlap distribution of two particles sampled uniformly from N(t,x) converges to that of the critical derivative martingale measure. This establishes a universal genealogical picture of the BBM front at sublinear distances from the tip.

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