English

The critical one-dimensional multi-particle DLA

Probability 2020-09-11 v2

Abstract

We study one-dimensional multi-particle Diffusion Limited Aggregation (MDLA) at its critical density λ=1\lambda=1. Previous works have verified that the size of the aggregate XtX_t at time tt is t1/2t^{1/2} in the subcritical regime and linear in the supercritical regime. This paper establishes the conjecture that the growth rate at criticiality is t2/3t^{2/3}. Moreover, we derive the scaling limit proving that {t2/3Xst}s0d{0sZudu}s0,\big\{ t^{-2/3}X_{st} \big\}_{s\geq 0} \overset{d}{\rightarrow} \Big\{ \int_0^s Z_u du \Big\}_{s\geq 0}, where the speed process {Zt}\{Z_t\} is a (13)(-\frac{1}{3})-self-similar diffusion given by Zt=(3Vt)2/3Z_t = (3V_t)^{-2/3}, where VtV_t is the 83\frac{8}{3}-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 dZt=2Zt5/2dBtdZ_t = 2Z_t^{5/2}dB_t. 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}
}
R2 v1 2026-06-23T18:20:44.523Z