Morphological transition between diffusion-limited and ballistic aggregation growth patterns
Abstract
In this work, the transition between diffusion-limited and ballistic aggregation models was revisited using a model in which biased random walks simulate the particle trajectories. The bias is controlled by a parameter λ, which assumes the value λ=0 (1) for ballistic (diffusion-limited) aggregation model. Patterns growing from a single seed were considered. In order to simulate large clusters, a new efficient algorithm was developed. For λ 0, the patterns are fractal on the small length scales, but homogeneous on the large ones. We evaluated the mean density of particles in the region defined by a circle of radius r centered at the initial seed. As a function of r, reaches the asymptotic value 0(λ) following a power law =0+Ar-γ with a universal exponent γ=0.46(2), independent of λ. The asymptotic value has the behavior 0|1-λ|β, where β= 0.26(1). The characteristic crossover length that determines the transition from DLA- to BA-like scaling regimes is given by |1-λ|-, where =0.61(1), while the cluster mass at the crossover follows a power law M|1 -λ|-α, where α=0.97(2). We deduce the scaling relations β= uγ and β=2-α between these exponents.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.