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The unstable spectrum of swirling gas flows

Published online by Cambridge University Press:  04 August 2005

S. LEBLANC
Affiliation:
LSEET, Université du Sud Toulon-Var, France
A. LE DUC
Affiliation:
Fachgebiet Hydromechanik, Technische Universität München, Germany DLR, AS/TA, Braunschweig, Germany

Abstract

The asymptotic structure of the discrete spectrum of a compressible inviscid swirling flow with arbitrary radial distributions of density, pressure and velocity is described for disturbances with large wavenumbers. It is shown that discrete eigenmodes are unstable when a criterion derived by Eckhoff & Storesletten (1978) is satisfied. In general, these modes are characterized by a length scale of order $|m|^{-3/4}$ where $|m|\,{\gg}\,1$ is the azimuthal wavenumber of the disturbance. They have a spatial structure similar to the incompressible modes obtained by Leibovich & Stewartson (1983). In the particular case of solid-body rotation with a positive gradient of entropy, the unstable discrete spectrum contains modes which scale with $|m|^{-1/2}$. If the modes are localized near a solid boundary, they scale with $|m|^{-2/3}$.

Type
Papers
Copyright
© 2005 Cambridge University Press

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