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Waves in a rapidly rotating gas

Published online by Cambridge University Press:  20 April 2006

John W. Miles
Affiliation:
Institute of Geophysics and Planetary Physics. University of California, San Diego, La Jolla, California 92093

Abstract

The eigenvalue problem for the ‘acoustic’ modes in an inviscid, perfect gas with a quiescent state of isothermal, uniform rotation in a circular cylinder is solved asymptotically for A2 ↑ ∞ with (γ — 1) A2 = O(1), where A is the peripheral Mach number and γ is the specific heat ratio. The limit (γ — 1) A2 ↓ 0 leads to a solution in terms of the confluent hypergeometric function for all A, and the resulting eigenvalue equation is solved explicitly for either A2 [lsim ] 1 or A2 [Gt ] 1. Attention is focused on those modes (likely to be of greatest practical importance) for which the peripheral speed of the wave relative to that of the container tends to the sonic speed as A2 ↑ ∞. Viscosity and heat conduction are significant in an inner domain of low density, wherein the solution is expressed in terms of a generalized hypergeometric function.

Type
Research Article
Copyright
© 1981 Cambridge University Press

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References

Gans, R. F. 1974 On the Poincaré problem for a compressible medium. J. Fluid Mech. 62, 657675.Google Scholar
Ince, E. L. 1944 Ordinary Differential Equations. Dover.
Lamb, H. 1932 Hydrodynamics. Cambridge University Press.
Morton, J. B. & Shaughnessy, E. J. 1972 Waves in a gas in solid-body rotation. J. Fluid Mech. 56, 277286.Google Scholar
Slater, L. J. 1960 Confluent Hypergeometric Functions. Cambridge University Press.
Wright, E. M. 1935 The asymptotic expansion of the generalized hypergeometric function. J. Lond. Math. Soc. 10, 28693.Google Scholar
Vanowitch, M. 1967 Effect of viscosity on gravity waves and the upper boundary condition. J. Fluid Mech. 29, 209231.Google Scholar