Branching Brownian motion with generation-dependent diffusivity and nonlocal partial differential equations
Abstract
We study a voting model on a branching Brownian motion process on R in which the diffusivity of each child particle is increased from that of the parent by a factor of γ>1. The probability distribution of the overall vote is given in terms of the solution to a nonlocal nonlinear PDE. We exhibit conditions on the nonlinearity such that the long-time behavior of the distribution undergoes a phase transition in γ. If γ is sufficiently large, then the long-time distribution converges to uniform. If γ is close enough to 1, then the long-time distribution depends in a nontrivial way on the location of the initial particle. The limiting dependence is given by a steady-state solution to the nonlocal PDE. Our study gives a probabilistic interpretation of a class of semilinear nonlocal PDEs. Interestingly, while the PDE are nonlocal, the underlying random process does not require any non-local interactions.
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