The all-time maximum for branching Brownian motion with absorption conditioned on long-time survival
Abstract
We consider branching Brownian motion in which initially there is one particle at x, particles produce a random number of offspring with mean m+1 at the time of branching events, and each particle branches at rate β = 1/2m. Particles independently move according to Brownian motion with drift -1 and are killed at the origin. It is well-known that this process eventually dies out with positive probability. We condition this process to survive for an unusually large time t and study the behavior of the process at small times s t using a spine decomposition. We show, in particular, that the time when a particle gets furthest from the origin is of the order t5/6.
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