Scaling exponent of the maximum growth probability in diffusion-limited aggregation
arXiv:cond-mat/0212177 · doi:10.1103/PhysRevE.67.042402
Abstract
An early (and influential) scaling relation in the multifractal theory of Diffusion Limited Aggregation(DLA) is the Turkevich-Scher conjecture that relates the exponent α_{min} that characterizes the ``hottest'' region of the harmonic measure and the fractal dimension D of the cluster, i.e. D=1+α_{min}. Due to lack of accurate direct measurements of both D and α_{min} this conjecture could never be put to serious test. Using the method of iterated conformal maps D was recently determined as D=1.713+-0.003. In this Letter we determine α_{min} accurately, with the result α_{min}=0.665+-0.004. We thus conclude that the Turkevich-Scher conjecture is incorrect for DLA.
4 pages, 5 figures