ISSN:
1434-6036
Keywords:
PACS. 64.70.Fx Liquid-vapor transitions - 64.60.Qb Nucleation - 68.45.Da Adsorption and desorption kinetics; evaporation and condensation
Source:
Springer Online Journal Archives 1860-2000
Topics:
Physics
Notes:
Abstract: We study a single, motionless three-dimensional droplet growing by adsorption of diffusing monomers on a 2D substrate. The diffusing monomers are adsorbed at the aggregate perimeter of the droplet with different boundary conditions. Models with both an adsorption boundary condition and a radiation boundary condition, as well as a phenomenological model, are considered and solved in a quasistatic approximation. The latter two models allow particle detachment. In the short time limit, the droplet radius grows as a power of the time with exponents of 1/4, 1/2 and 3/4 for the models with adsorption, radiation and phenomenological boundary conditions, respectively. In the long time limit a universal growth rate as is observed for the radius of the droplet for all models independent of the boundary conditions. This asymptotic behaviour was obtained by Krapivsky [#!krapquasi!#] where a similarity variable approach was used to treat the growth of a droplet with an adsorption boundary condition based on a quasistatic approximation. Another boundary condition with a constant flux of monomers at the aggregate perimeter is also examined. The results exhibit a power law growth rate with an exponent of 1/3 for all times.
Type of Medium:
Electronic Resource
URL:
http://dx.doi.org/10.1007/s100510050114
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