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Cited by 29 publications
(9 citation statements)
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“…The change of the basic size of crystals may be described by the continuity equation (Melikhov and Berliner 1981): (5) where G 1 is the rate of directional crystal enlargement, a 1 is the fluctuations growth parameter, and Ω is the frequency of crystals disconnection from the underlying matrix and carried away by the solution.…”
Section: Modelmentioning
confidence: 99%
“…The change of the basic size of crystals may be described by the continuity equation (Melikhov and Berliner 1981): (5) where G 1 is the rate of directional crystal enlargement, a 1 is the fluctuations growth parameter, and Ω is the frequency of crystals disconnection from the underlying matrix and carried away by the solution.…”
Section: Modelmentioning
confidence: 99%
“…The change of the basic size of crystals may be described by the continuity equation (Melikhov and Berliner 1981):…”
Section: Modelmentioning
confidence: 99%
“…Subsequently the same authors (1982b,c) critically examined a number of other methods available to characterise the dispersion parameters of crystal population derived from either secondary contact nuclei or seeding process. Melikhov and Berliner (1981) also presented the simulation of batch crystallizer configuration with the growth rate dispersion phenomenon.…”
Section: Characterisationmentioning
confidence: 99%
“…Randolph and White [28] have applied the deterministic population balance equation with an added diffusivity term to model the phenomenon of fluctuations in growth rate. Melikhov and Berliner [20] have also resorted to the deterministic population balance approach with random fluctuations in growth rate to simulate the CSD in a well-mixed batch crystallizer. The effects of distributions of the initial crystal size, growth rate, and residence time on the CSD have been investigated by Ramanarayanan et al [25] and Berglund and Larson [2].…”
Section: Introductionmentioning
confidence: 99%
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