Nonuniversal diffusion-limited aggregation and exact fractal dimensions
- 1 March 1994
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review E
- Vol. 49 (3) , R1788-R1791
- https://doi.org/10.1103/physreve.49.r1788
Abstract
In analogy to recent results on nonuniversal roughening in surface growth [Lam and Sander, Phys. Rev. Lett. 69, 3338 (1992)], we propose a variant of diffusion-limited aggregation (DLA) in which the radii of the particles are chosen from a power-law distribution. For very broad distributions, the huge particles dominate and the fractal dimension is calculated exactly using a scaling theory. For narrower distributions, it crosses back to DLA. We simulated 1200 clusters containing up to 200 000 particles. The fractal dimensions obtained are in reasonable agreement with our theory. This variant of DLA might have relevance to the cluster-cluster aggregation model.Keywords
This publication has 11 references indexed in Scilit:
- Exact scaling in surface growth with power-law noisePhysical Review E, 1993
- Multiscaling analysis and width of the active zone of large off-lattice DLAPhysica A: Statistical Mechanics and its Applications, 1993
- Surface growth with power-law noisePhysical Review Letters, 1992
- Theory of branched growthPhysical Review A, 1992
- Fractal Growth PhenomenaPublished by World Scientific Pub Co Pte Ltd ,1992
- Kinetic roughening by exceptional fluctuationsJournal de Physique I, 1991
- Growth anomaly and its implicationsPhysica A: Statistical Mechanics and its Applications, 1990
- Off-lattice and hypercubic-lattice models for diffusion-limited aggregation in dimensionalities 2–8Physical Review A, 1989
- Diffusion-limited aggregationPhysical Review B, 1983
- Diffusion-Limited Aggregation, a Kinetic Critical PhenomenonPhysical Review Letters, 1981