Diffusion-Limited Aggregation Processes with 3-Particle Elementary Reactions
Abstract
A diffusion-limited aggregation process, in which clusters coalesce by means of 3-particle reaction, A+A+A->A, is investigated. In one dimension we give a heuristic argument that predicts logarithmic corrections to the mean-field asymptotic behavior for the concentration of clusters of mass m at time t, c(m,t)~m-1/2(log(t)/t)3/4, for 1 << m << t/log(t). The total concentration of clusters, c(t), decays as c(t)~log(t)/t at t --> ∞. We also investigate the problem with a localized steady source of monomers and find that the steady-state concentration c(r) scales as r-1(log(r))1/2, r-1, and r-1(log(r))-1/2, respectively, for the spatial dimension d equal to 1, 2, and 3. The total number of clusters, N(t), grows with time as (log(t))3/2, t1/2, and t(log(t))-1/2 for d = 1, 2, and 3. Furthermore, in three dimensions we obtain an asymptotic solution for the steady state cluster-mass distribution: c(m,r) r-1(log(r))-1(z), with the scaling function (z)=z-1/2(-z) and the scaling variable z ~ m/log(r).
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