Mathematics – Probability
Scientific paper
2007-02-15
Journal of Statistical Physics (2008) 130: 579-597
Mathematics
Probability
18 pages, 3 figures, some errors corrected and more explanation added, to appear in Journal of Statistical Physics
Scientific paper
10.1007/s10955-007-9450-6
We study the rotor router model and two deterministic sandpile models. For the rotor router model in $\mathbb{Z}^d$, Levine and Peres proved that the limiting shape of the growth cluster is a sphere. For the other two models, only bounds in dimension 2 are known. A unified approach for these models with a new parameter $h$ (the initial number of particles at each site), allows to prove a number of new limiting shape results in any dimension $d \geq 1$. For the rotor router model, the limiting shape is a sphere for all values of $h$. For one of the sandpile models, and $h=2d-2$ (the maximal value), the limiting shape is a cube. For both sandpile models, the limiting shape is a sphere in the limit $h \to -\infty$. Finally, we prove that the rotor router shape contains a diamond.
Fey Anne
Redig Frank
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