Internal Diffusion Limited Aggregation with Critical Branching Random Walks

Abstract

Internal Diffusion Limited Aggregation is an interacting particle system that describes the growth of a random cluster governed by the boundary harmonic measure seen from an internal point. Our paper studies IDLA in Zd driven by critical branching random walks. We prove that, unlike classical IDLA, this process exhibits a phase transition in the dimension. More precisely, we establish the existence of a spherical shape theorem in dimension d≥ 3 and the absence of a spherical shape theorem for d ≤ 2. Our bounds on the inner and outer worst deviations are of polynomial nature, which we expect to be a feature of this model.

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