Three fundamental problems of molecular statistics can be identified using the shape of a nanoparticle and the curvature of a λ-layer surrounding it, which correspond to the polar, axial, and plane symmetry. Within the framework of a single-velocity approximation, solutions to these problems are constructed and formulas for coefficients of average resistance to motion of variously-shaped particles are found.
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References
I. Newton, The Mathematical Principles of Natural Philosophy [Russian Translation], Moscow, Nauka (1989).
J. C. Maxwell, Matter and Motion [Russian translation], Moscow-Izhevsk, RHD (2001).
A. I. Potekaev and M. A. Bubenchikov, Russ. Phys. J., 54, No. 2, 211–220 (2011).
A. I. Potekaev, A. M. Bubenchikov, and M. A. Bubenchikov, Russ. Phys. J., 55, No. 12, 1434–1443 (2013).
V. B. Antipov, M. A. Bubenchikov, Yu. V. Medvedev, et al., The energy security of Russia. New approaches to the development of the coal industry, in: Proc. XII Int. Sci.-Pract. Conf., 103–105, Kemerovo (2010).
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Translated from Izvestiya Vysshikh Uchebnykh Zavedenii, Fizika, No. 3, pp. 94–100, March, 2013.
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Bubenchikov, M.A., Potekaev, A.I. & Bubenchikov, A.M. Three fundamental problems of molecular statistics. Russ Phys J 56, 341–348 (2013). https://doi.org/10.1007/s11182-013-0038-0
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DOI: https://doi.org/10.1007/s11182-013-0038-0