Two-Sided Free Boundary Problems Arising From Branching-Selection Particle Systems

Abstract

We introduce and analyse a two-sided branching-selection particle system which generalises the well-known N-particle branching Brownian motion (N-BBM) model, which we call the (N,p)-BBM, where either the leftmost or rightmost particle is deleted at each branching event according to a parameter p∈(0,1). We establish that, as N∞, the empirical distribution of the (N,p)-BBM converges to a deterministic hydrodynamic limit described by a free boundary problem on a finite interval with two moving boundaries, and Neumann and Dirichlet boundary conditions parametrized by p. Again, this generalises the one-sided free boundary problem which characterises the hydrodynamic limit of the N-BBM. Existence and regularity of the free boundary problem is also proved, by appealing to a connection with inverse first passage problems. We further prove that the asymptotic velocity vN,p of the (N,p)-BBM converges, as N∞, to vp, the unique travelling wave speed of the limiting free boundary problem. These results generalize previous one-sided models and connect to broader classes of free boundary problems found in evolutionary dynamics and flame propagation.

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