English

On Diffusion Limited Deposition

Probability 2015-11-24 v2

Abstract

We propose a simple model of columnar growth through {\it diffusion limited aggregation} (DLA). Consider a graph GN×NG_N\times\N, where the basis has NN vertices GN:={1,,N}G_N:=\{1,\dots,N\}, and two vertices (x,h)(x,h) and (x,h)(x',h') are adjacent if hh1|h-h'|\le 1. Consider there a simple random walk {\it coming from infinity} which {\it deposits} on a growing cluster as follows: the cluster is a collection of columns, and the height of the column first hit by the walk immediately grows by one unit. Thus, columns do not grow laterally. We prove that there is a critical time scale N/log(N)N/\log(N) for the maximal height of the piles, i.e., there exist constants α<β\alpha<\beta such that the maximal pile height at time αN/log(N)\alpha N/\log(N) is of order log(N)\log(N), while at time βN/log(N)\beta N/\log(N) is larger than NχN^\chi. This suggests that a \emph{monopolistic regime} starts at such a time and only the highest pile goes on growing. If we rather consider a walk whose height-component goes down deterministically, the resulting \emph{ballistic deposition} has maximal height of order log(N)\log(N) at time NN. These two deposition models, diffusive and ballistic, are also compared with uniform random allocation and Polya's urn.

Keywords

Cite

@article{arxiv.1505.03892,
  title  = {On Diffusion Limited Deposition},
  author = {A. Asselah and E. Cirillo and E. Scoppola and B. Scoppola},
  journal= {arXiv preprint arXiv:1505.03892},
  year   = {2015}
}

Comments

36 pages, 5 figures, revised version

R2 v1 2026-06-22T09:34:35.440Z