Logarithmic fluctuations for internal DLA
arXiv:1010.2483
Abstract
Let each of n particles starting at the origin in Z^2 perform simple random walk until reaching a site with no other particles. Lawler, Bramson, and Griffeath proved that the resulting random set A(n) of n occupied sites is (with high probability) close to a disk B_r of radius r=\sqrt{n/Ï}. We show that the discrepancy between A(n) and the disk is at most logarithmic in the radius: i.e., there is an absolute constant C such that the following holds with probability one: B_{r - C \log r} \subset A(Ïr^2) \subset B_{r+ C \log r} for all sufficiently large r.
38 pages, 5 figures, v2 addresses referee comments. To appear in Journal of the AMS