The critical one-dimensional multi-particle DLA
Abstract
We study one-dimensional multi-particle Diffusion Limited Aggregation (MDLA) at its critical density . Previous works have verified that the size of the aggregate at time is in the subcritical regime and linear in the supercritical regime. This paper establishes the conjecture that the growth rate at criticiality is . Moreover, we derive the scaling limit proving that where the speed process is a -self-similar diffusion given by , where is the -Bessel process. The proof shows that locally the speed process can be well approximated by a stochastic integral representation which itself can be approximated by a critical branching process with continuous edge lengths. From these representations, we determine its infinitesimal drift and variance to show that the speed asymptotically satisfies the SDE . To make these approximations, regularity properties of the process are established inductively via a multiscale argument.
Keywords
Cite
@article{arxiv.2009.02761,
title = {The critical one-dimensional multi-particle DLA},
author = {Dor Elboim and Danny Nam and Allan Sly},
journal= {arXiv preprint arXiv:2009.02761},
year = {2020}
}