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Diffusion-limited droplet coalescence

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  • Meakin, Paul

Abstract

Simulations of diffusion limited (Brownian) droplet coalescence have been carried out in which the droplet diffusion coefficients are related to their sizes (masses), s, by D(s)∼sγ. For the case D = d where D is the droplet dimensionality and d is the dimensionality of the substrate, the exponents z and z′ describing the algebraic growth of the mean droplet size, S, and the decrease in the number of droplets, N, are given by z = z′= 1(2d − γ) with no logarithmic corrections for d = 2. If D > d, then for d = 2 the growth of S is given by S ∼[tln(t)]1(1−γ) and the decay of N is given by N ∼ [tln(t)]−1(1−γ). For d > 2, there are no logarithmic corrections and z = z′= D(D−Dγ−d + 2) in all cases. The time dependent cluster size distribution can be described in terms of the scaling form Ns(t)∼s−2f(sS(t)) where Ns(t) is the number of droplets of size s at time t. Simple scaling arguments indicate that these values obtained for the exponents z and z′ describing the asymptotic (t→∞) behavior from computer simulations are exact.

Suggested Citation

  • Meakin, Paul, 1990. "Diffusion-limited droplet coalescence," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 165(1), pages 1-18.
  • Handle: RePEc:eee:phsmap:v:165:y:1990:i:1:p:1-18
    DOI: 10.1016/0378-4371(90)90238-N
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    Citations

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    Cited by:

    1. Hontinfinde, Felix & Krug, Joachim & Touzani, M'hamed, 1997. "Growth with surface diffusion in d = 1 + 1," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 237(3), pages 363-383.
    2. Basak, Uttam Kumar & Datta, Alokmay, 2017. "Anomalous behaviour of droplet coalescence in a two-dimensional complex system," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 486(C), pages 284-295.
    3. Arneodo, A. & Bacry, E. & Muzy, J.F., 1995. "The thermodynamics of fractals revisited with wavelets," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 213(1), pages 232-275.
    4. Bershadskii, A., 1997. "Dimension-invariance, multifractality and complexity in some classical and quantum systems," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 245(3), pages 238-252.
    5. Coniglio, Antonio, 1993. "Is diffusion limited aggregation scale invariant?," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 200(1), pages 165-170.
    6. Meakin, Paul & Jullien, Remi, 1992. "Simple models for two and three dimensional particle size segregation," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 180(1), pages 1-18.
    7. Alexander Ziepke & Ivan Maryshev & Igor S. Aranson & Erwin Frey, 2022. "Multi-scale organization in communicating active matter," Nature Communications, Nature, vol. 13(1), pages 1-10, December.

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