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Localization of Growth Sites in DLA Clusters: Multifractality and Multiscaling

arXiv:cond-mat/9304030 · doi:10.1103/PhysRevE.48.1305

Abstract

The growth of a diffusion limited aggregation (DLA) cluster with mass $M$ and radius of gyration $R$ is described by a set of growth probabilities $\{ p_i\}$, where $p_i$ is the probability that the perimeter site $i$ will be the next to grow. We introduce the joint distribution $N(α, x, M)$, where $N(α,x,M)dαdx$ is the number of perimeter sites with $α$-values in the range $α\le α_i \le α+dα$ (``$α$-sites'') and located in the annulus [x, x+dx] around the cluster seed. Here, $α_i \equiv -\ln p_i / \ln R$ if $p_i>0$, $x\equiv r_i/R$, and $r_i$ is the distance of site $i$ from the seed of the DLA cluster. We use $N(α,x,M)$ to relate multifractal and multiscaling properties of DLA. In particular, we find that for large $M$ the location of the $α$-sites is peaked around a fixed value $\bar x(α)$; in contrast, the perimeter sites with $p_i=0$ are uniformly distributed over the DLA cluster.

25 pages, REVTeX, 12 figures avaliable upon request, HLRZ preprint 29/93