Power law tail in the radial growth probability distribution for DLA

Abstract

Using both analytic and numerical methods, we study the radial growth probability distribution P(r,M) for large scale off lattice diffusion limited aggregation (DLA) clusters. If the form of P(r,M) is a Gaussian, we show analytically that the width (M) of the distribution can not scale as the radius of gyration RG of the cluster. We generate about 1750 clusters of masses M up to 500,000 particles, and calculate the distribution by sending 106 further random walkers for each cluster. We give strong support that the calculated distribution has a power law tail in the interior (r 0) of the cluster, and can be described by a scaling Ansatz P(r,M) rα· g( r-r0 ), where g(x) denotes some scaling function which is centered around zero and has a width of order unity. The exponent α is determined to be ≈ 2, which is now substantially smaller than values measured earlier. We show, by including the power-law tail, that the width can scale as RG, if α > Df-1.

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