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A class of solutions for steady stratified flows

Published online by Cambridge University Press:  29 March 2006

Chia-Shun Yih
Affiliation:
Department of Engineering Mechanics, The University of Michigan

Abstract

Under the assumption that the horizontal scales of the flow of a stratified fluid are much greater than the vertical scale, it can be shown that the pressure distribution in the fluid is nearly hydrostatic and that the solution for steady flows can be reduced to the solution of a non-linear partial differential equation with only horizontal co-ordinates as the space variables. The theory built on the basic assumption is the shallow-water theory for stratified fluids. Transformations are explicitly given with which a class of solutions for steady three-dimensional flows of a fluid of arbitrary stratification, continuous or discontinuous, issuing from a large reservoir can be found from a corresponding solution for a homogeneous fluid, provided a free surface is present and the shallow-water theory is applicable. A few examples of exact solutions according to the shallow-water theory are given and the parallel flow in a horizontal canal issuing from a large reservoir with the same horizontal bottom, which has some bearing on previous works on stratified flows, is discussed. But it is emphasized that the class is a very special one and that there are other solutions not belonging to this class. The conditions under which a solution belonging to this class is valid are discussed.

Type
Research Article
Copyright
© 1969 Cambridge University Press

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References

Chaplygin, S. A. 1904 On gas jets Sci. Mem. Moscow Univ. Math. Phys. Soc. 21, 1121. (Translation: NACA Tech. Mem. 1063, 1944.)Google Scholar
Ferguson, D. F. & Lighthill, M. J. 1947 The hodograph transformation in trans-sonic flow, IV. Tables. Proc. Roy. Soc A 192, 3542.Google Scholar
Molenbroek, P. 1890 Ueber einige Bewegungen eines Gases bei Annahme eines Geschwindigkeitspotentials Arch. Math. Phys. 9, 157195.Google Scholar
Riabouchinsky, D. 1932 Sur I'analogie hydraulique des mouvements d'un fluide compressible Acad. Sci., Comptes Rendus, 195, 9989.Google Scholar
Yih, C-S. 1958 On the flow of a stratified fluid. Proc. 3rd U.S. Nat. Cong. Appl. Mech. 85761.Google Scholar
Yih, C-S. 1965 Dynamics of Nonhomogeneous Fluids. New York: MacMillan.
Yih, C-S. 1967 Equations governing steady three-dimensional large-amplitude motion of a stratified fluid J. Fluid Mech. 29, 53944.Google Scholar