Logarithmic Fluctuations for Internal DLA

Author(s)

Jerison, David S.; Levine, Lionel; Sheffield, Scott Roger

Abstract

Let each of [superscript n] particles starting at the origin in Z[superscript 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 [superscript n] occupied sites is (with high probability) close to a disk B [subscript r] of radius r=√n/pi. 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 [superscript C] such that with probability [superscript 1], B [subscript r - C log r] C A(pi r[superscript 2]) C B [subscript r+ C log r] for all sufficiently large r.

Date issued

2011-08

URI

http://hdl.handle.net/1721.1/71522

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Journal of the American Mathematical Society

Publisher

American Mathematical Society (AMS)

Citation

Jerison, David, Lionel Levine, and Scott Sheffield. “Logarithmic Fluctuations for Internal DLA.” Journal of the American Mathematical Society 25.1 (2011).

Version: Author's final manuscript

ISSN

0894-0347

1088-6834