Abstract
A physicomathematical model of dispersion and homogenization in a liquid–liquid medium which is based on the system of equations for the probability density of the size of disperse particles has been developed. The proposed model takes into account the processes of turbulent atomization and cavitation reduction in size and the process of coalescence of the dispersed-phase drops.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
REFERENCES
V. D. Surkov, in: Tr. MTIMMPa (1954), pp. 85–92.
P. A. Rebinder, Kolloidn. Zh., No. 8, 157–173 (1946).
L. Ya. Kremnev and A. A. Ravdel', Kolloidn. Zh., No. 16, 17–28 (1954).
C. C. Loo, W. L. Slatter, and R. W. Powell, J. Dairy Sci., 36, No. 1, 64–75 (1953).
A. V. Kolmogorov, Dokl. Akad. Nauk SSSR, 66, No. 2, 825–828 (1949).
V. A. Sosinovich, B. A. Kolovandin, V. A. Tsyganov, and C. Meola, Int. J. Heat Mass Transfer, 30, No. 3, 517–526 (1987).
A. S. Monin and A. M. Yaglom, Statistical Hydromechanics [in Russian], Pt. 2, Moscow (1967).
R. Knapp, J. Daily, and F. Hammit, Cavitation [Russian translation], Moscow (1974).
R. I. Nigmatulin, Dynamics of Multiphase Media [in Russian], Moscow (1987).
V. M. Voloshchuk and J. S. Sedunov, Processes of Coalescence in Disperse Systems [in Russian], Leningrad (1975).
S. Chandrasekhar, Stochastic Problems in Physics and Astronomy [Russian translation], Moscow (1947).
V. A. Sosinovich and V. A. Tsyganov, Inzh.-Fiz. Zh., 46, No. 2, 219–225 (1984). 337 `
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Baranova, T.A., Sosinovich, V.A. Statistical Dispersion Model to Describe the Processes in a Homogenizer of the “Liquid–Liquid”-Type. Journal of Engineering Physics and Thermophysics 75, 331–337 (2002). https://doi.org/10.1023/A:1015681219477
Issue Date:
DOI: https://doi.org/10.1023/A:1015681219477