The critical one-dimensional multi-particle DLA

Abstract

We study one-dimensional multi-particle Diffusion Limited Aggregation (MDLA) at its critical density λ=1. Previous works have verified that the size of the aggregate Xt at time t is t1/2 in the subcritical regime and linear in the supercritical regime. This paper establishes the conjecture that the growth rate at criticiality is t2/3. Moreover, we derive the scaling limit proving that \ t-2/3Xst \s≥ 0 d→ \ ∫0s Zu du \s≥ 0, where the speed process \Zt\ is a (-13)-self-similar diffusion given by Zt = (3Vt)-2/3, where Vt is the 83-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 = 2Zt5/2dBt. To make these approximations, regularity properties of the process are established inductively via a multiscale argument.