Self-repellent branching random walk

Abstract

We consider a system of particles performing a discrete-time binary branching random walk with independent standard normal increments subject to a penalty for every pair of particles that get within distance of each other at every time. We study the optimal configurations that minimise the sum of the spread out cost and the repulsion cost up to a given time horizon N. We show that at time N particles are spread out over a distance ()1/3 22N/3. We also show that the total cost of the optimal configurations up to time N is ()2/3 24N/3.

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