Survival of near-critical branching Brownian motion

Abstract

Consider a system of particles performing branching Brownian motion with negative drift μ = 2 - ε and killed upon hitting zero. Initially there is one particle at x>0. Kesten showed that the process survives with positive probability if and only if ε>0. Here we are interested in the asymptotics as 0 of the survival probability Qμ(x). It is proved that if L= π/ε then for all x ∈ , ε 0 Qμ(L+x) = θ(x) ∈ (0,1) exists and is a travelling wave solution of the Fisher-KPP equation. Furthermore, we obtain sharp asymptotics of the survival probability when x<L and L-x ∞. The proofs rely on probabilistic methods developed by the authors in a previous work. This completes earlier work by Harris, Harris and Kyprianou and confirms predictions made by Derrida and Simon, which were obtained using nonrigorous PDE methods.