Strong Spherical Asymptotics for Rotor-Router Aggregation and the Divisible Sandpile

Abstract

The rotor-router model is a deterministic analogue of random walk. It can be used to define a deterministic growth model analogous to internal DLA. We prove that the asymptotic shape of this model is a Euclidean ball, in a sense which is stronger than our earlier work. For the shape consisting of n=ωd rd sites, where ωd is the volume of the unit ball in d, we show that the inradius of the set of occupied sites is at least r-O( r), while the outradius is at most r+O(rα) for any α > 1-1/d. For a related model, the divisible sandpile, we show that the domain of occupied sites is a Euclidean ball with error in the radius a constant independent of the total mass. For the classical abelian sandpile model in two dimensions, with n=π r2 particles, we show that the inradius is at least r/3, and the outradius is at most (r+o(r))/2. This improves on bounds of Le Borgne and Rossin. Similar bounds apply in higher dimensions.