Internal DLA on cylinder graphs: fluctuations and mixing

Abstract

We use coupling ideas introduced in levine2018long to show that an IDLA process on a cylinder graph G× Z forgets a typical initial profile in O( NτN ( \! N)2 ) steps for large N, where N is the size of the base graph G, and τN is the total variation mixing time of a simple random walk on G. The main new ingredient is a maximal fluctuations bound for IDLA on G× Z which only relies on the mixing properties of the base graph G and the Abelian property.