Diffusion Limited Aggregation with Power-Law Pinning
Abstract
Using stochastic conformal mapping techniques we study the patterns emerging from Laplacian growth with a power-law decaying threshold for growth RN-γ (where RN is the radius of the N- particle cluster). For γ > 1 the growth pattern is in the same universality class as diffusion limited aggregation (DLA) growth, while for γ < 1 the resulting patterns have a lower fractal dimension D(γ) than a DLA cluster due to the enhancement of growth at the hot tips of the developing pattern. Our results indicate that a pinning transition occurs at γ = 1/2, significantly smaller than might be expected from the lower bound αmin 0.67 of multifractal spectrum of DLA. This limiting case shows that the most singular tips in the pruned cluster now correspond to those expected for a purely one-dimensional line. Using multifractal analysis, analytic expressions are established for D(γ) both close to the breakdown of DLA universality class, i.e., γ 1, and close to the pinning transition, i.e., γ 1/2.
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