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Local baroclinic instability of flow over variable topography

Published online by Cambridge University Press:  26 April 2006

R. M. Samelson  and
J. Pedlosky
R. M. Samelson
Affiliation:
Woods Hole Oceanographic Institution, Woods Hole, MA 02543, USA
J. Pedlosky
Affiliation:
Woods Hole Oceanographic Institution, Woods Hole, MA 02543, USA
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Abstract

Local baroclinic instability is studied in a two-layer quasi-geostrophic model. Variable meridional bottom slope controls the local supercriticality of a uniform zonal flow. Solutions are found by matching pressure, velocity, and upper-layer vorticity across longitudes where the bottom slope changes abruptly so as to destabilize the flow in a central interval of limited zonal extent. In contrast to previous results from heuristic models, an infinite number of modes exist for arbitrarily short intervals. For long intervals, modal growth rates and frequencies approach the numerical and WKB results for the most unstable mode. For intervals of length comparable to and smaller than the wavelengths of unstable waves in the homogeneous problem, the WKB results lose accuracy. The modes retain large growth rates (about half maximum) for intervals as short as the internal deformation radius. Evidently, the deformation radius and not the homogeneous instability determines the fundamental scale for local instability. Maximum amplitudes occur near the downstream edge of the unstable interval. Lower-layer amplitudes decay downstream more rapidly than upper-layer amplitudes. For short intervals, the instability couples motions with widely disparate horizontal scales in the upper and lower layers. Heat flux is more strictly confined than amplitude. Growth rates increase linearly with weak supercriticality.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 221 , December 1990 , pp. 411 - 436
Copyright
© 1990 Cambridge University Press

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