Critical Drift for Brownian Bees and a Reflected Brownian Motion Invariance Principle

Abstract

N-Brownian bees is a branching-selection particle system in Rd in which N particles behave as independent binary branching Brownian motions, and where at each branching event, we remove the particle furthest from the origin. We study a variant in which d=1 and particles have an additional drift μ∈R. We show that there is a critical value, μcN, and three distinct regimes (sub-critical, critical, and super-critical) and we describe the behaviour of the system in each case. In the sub-critical regime, the system is positive Harris recurrent and has an invariant distribution; in the super-critical regime, the system is transient; and in the critical case, after rescaling, the system behaves like a single reflected Brownian motion. We also show that the critical drift μcN is in fact the speed of the well-studied N-BBM process, and give a rigorous proof for the speed of N-BBM, which was missing in the literature.

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