Vortex Motion of Fluid in Rotating Channels of Variable Depth
| Authors: Gurchenkov A.A., Vilisova N.T. | Published: 09.02.2018 |
| Published in issue: #1(118)/2018 | |
| Category: Mechanics | Chapter: Mechanics of Liquid, Gas, and Plasma | |
| Keywords: perfect fluid, rotating channel, theory of "shallow water", free surface shape, Kelvin waves | |
The article considers the wave motion of a perfect fluid in rotating channels of simple geometric shapes. The Euler equations describing the dynamics of the perfect fluid are linearized within the "shallow water" theory. The paper examines the spread of long waves along the perfect fluid surface in an open rotating channel of limited width and finite depth. The task is reduced to a partial differential equation for elevation of perfect fluid free surface. The article suggests the solution as a set of waves running both along and across the channel. The paper shows that there are Kelvin, Poincare waves and low-frequency Rossby waves in rotating channels of variable depth with the presence of at least one boundary
References
[1] Gurchenkov A.A. Dinamika zavikhrennoy zhidkosti v polosti vrashchayushchegosya tela [Fluid vortex dynamics in spinning body cavity]. Moscow, Fizmatlit Publ., 2010. 221 p.
[2] Chesnokov A.A. Characteristic properties and exact solutions of the kinetic equation of bubbly liquid. Journal of Applied Mechanics and Technical Physics, 2003, vol. 44, no. 3, pp. 336–343. DOI: 10.1023/A:1023477022213 Available at: https://link.springer.com/article/10.1023/A%3A1023477022213
[3] Lyapidevskiy V.Yu., Chesnokov A.A. Sub- and supercritical horizontal-shear flows in an open channel of variable cross-section. Fluid Dynamics, 2009, vol. 44, no. 6, pp. 903–916. DOI: 10.1134/S0015462809060143 Available at: https://link.springer.com/article/10.1134/S0015462809060143
[4] Pedlosky J. Geophysical fluid dynamics. New York, Springer-Verlag, 1979. 626 p.
[5] Chesnokov A.A. Symmetries and exact solutions of the shallow water equations for a two-dimensional shear flow. Journal of Applied Mechanics and Technical Physics, 2008, vol. 49, no. 5, pp. 737–748. DOI: 10.1007/s10808-008-0092-5 Available at: https://link.springer.com/article/10.1007/s10808-008-0092-5
[6] Chesnokov A.A. Symmetries and exact solutions of the rotating shallowwater equations. Fluid Dynamics, 2008, vol. 43, no. 3, pp. 447–460. DOI: 10.1134/S0015462808030125 Available at: https://link.springer.com/article/10.1134/S0015462808030125
[7] Chesnokov A.A. Fluid wave motion in rotating parabolic water tank. Sb. trudov XIII Vserossiyskoy konferentsii «Sovremennye problemy matematicheskogo modelirovaniya» [Proc. XIII Russ. Conf. "Modern problems of mathematical modelling"]. Dyurso, YuGINFO, YuFU, 2009. Pp. 442–449 (in Russ.).
[8] Ivanov M.I. Horizontal structure of atmospheric tidal oscillations. Izvestiya RAN. Mekhanika zhidkostey i gaza, 2008, no. 3, pp. 125–139 (in Russ.).
[9] Kalashnik M.V., Kakhiani V.O., Patarashvili K.I., Tsakadze S.J. Transition process in a fluid layer in a rotating paraboloid in response to a sudden change in its angular velocity. Fluid Dynamics, 2008, vol. 43, no. 3, pp. 380–389. DOI: 10.1134/S001546280803006X Available at: https://link.springer.com/article/10.1134/S001546280803006X
[10] Brysin A.N., Nikiforov A.N., Tatus N.A. Free oscillations of rotating fluid with free surface propagating not along the axis of the rotor with radial baffles. Sbornik trudov XVIII Mezhdunarodnogo simpoziuma «Dinamika vibroudarnykh (silno nelineynykh) sistem». DYVIS-2015 [Proc. XVIII Int. Symp. "Dynamics of shock-vibrating (highly nonlinear) systems". DYVIS-2015]. Moscow, Bekasovo, IMASh RAN PUBL., 2015. Pp. 77–81.
