Abstract
We analyze the principle of linearization and linear boundary-value problems obtained by using this principle in the nonlinear theory of motion for a bounded volume of liquid with free surface subjected to the action of a nonstationary oscillating load. We formulate and study the problem of vibrocapillary equilibrium state, spectral problems in the theory of linear waves, and problems of stability of equilibrium states, including the problem of bifurcation of equilibrium states.
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References
N. N. Moiseev and V. V. Rumyantsev, Dynamics of a Body with Cavities Partially Filled with Liquids [in Russian], Nauka, Moscow 1965.
I. A. Lukovskii, Introduction to the Nonlinear Dynamics of Bodies with Cavities Partially Filled by Liquids [in Russian], Naukova Dumka, Kiev (1990).
I. A. Lukovskii and A. N. Timokha, “On the influence of vibration on the geometry and stability of the free surface of a bounded volume of a liquid,” Dop. Akad. Nauk Ukrainy, No. 3, 65–68 (1993).
V. D. Lubimov and A. A. Cherepanov, “On the appearance of stationary patterns on the interface of liquids in vibrational fields,” Izv. Akad. Nauk SSSR. Mekh. Zhidk. Gaz., No. 6, 8–13 (1986).
G. N. Wolf, “The dynamic stabilization of the Rayleigh-Taylor instability on the corresponding dynamic equilibrium,” Z. Physik., 227, No. 3, 291–300 (1969).
G. H. Wolf, “Dynamic stabilization of the interchange instability of a liquid-gas interface,” Phys. Rev. Lett., 24, No. 9, 444–446 (1970).
R. F. Ganiev, V. D. Lakiza, and A. S. Tsapenko, “On the dynamic behavior of the free surface of a liquid subjected to vibrational loading under conditions close to weighdessness,” Prikl. Mekh., 13, No. 5, 102–107 (1977).
V. L. Ovsyannikov, N. I. Makarenko, V. I. Nalimov, et al, Nonlinear Problems in the Theory of Surface and Internal Waves [in Russian], Nauka, Novosibirsk 1985.
A. N. Timokha, Behavior of the Free Surface of a Liquid in Vibrating Vessels [in Russian], Preprint No. 92.22, Institute of Mathematics, Ukrainian Academy of Sciences, Kiev (1992).
A. D. Myshkis, V. G. Babsky, N. D. Kopachevskii, L. A. Slobozhanin, and A. D. Typsov, Low-Gravity Fluid Mechanics. Mathe- matical Theory of Capillary Phenomena, Springer, Berlin 1987.
I. A. Lukovskii and A. N. Timokha, “One class of boundary-value problems in the theory of surface waves,” Ukr. Mat. Zh., 43, No. 3, 359–364 (1991).
N. N. Ural’tseva, “Solvability of the problem of capillaries,” Vestn. Leningr. Univ., No. 1, Issue 1, 143–149 (1975).
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Lukovskii, I.A., Timokha, A.N. One version of the Linearized theory of nonstationary boundary-value problems with free boundary. Ukr Math J 48, 890–904 (1996). https://doi.org/10.1007/BF02384174
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DOI: https://doi.org/10.1007/BF02384174