1982
DOI: 10.1007/978-3-662-25730-2
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Geophysical Fluid Dynamics

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Cited by 673 publications
(880 citation statements)
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“…These characteristics agree qualitatively with the linear solution (Gill 1976). The frequency σ of the oscillations, when they occur, is given to within ±20% by the frequency of the linear Poincaré waves (Pedlosky 1987) with lowest cross-channel mode, zero along-channel wavenumber and depth equal to the average of the initial levels on either side of the dam (1 + d 0 )/2,…”
Section: Mean Transportsupporting
confidence: 74%
“…These characteristics agree qualitatively with the linear solution (Gill 1976). The frequency σ of the oscillations, when they occur, is given to within ±20% by the frequency of the linear Poincaré waves (Pedlosky 1987) with lowest cross-channel mode, zero along-channel wavenumber and depth equal to the average of the initial levels on either side of the dam (1 + d 0 )/2,…”
Section: Mean Transportsupporting
confidence: 74%
“…We consider the stability of the zonal flow in the standard quasi-geostrophic two-layer model on the beta-plane (see for example Pedlosky 1987). The governing equations for the nonlinear evolution of the disturbances are, in non-dimensional form,…”
Section: Formulation Of the Linear Problemmentioning
confidence: 99%
“…The perturbation method required to achieve an amplitude equation governing the nonlinear evolution of the wave is standard and can be found described in many places, e.g. Pedlosky (1987) so that only the briefest outline of the development is given here. Naturally, a full understanding of the nonlinear problem must eventually move beyond weakly nonlinear theory but it seems to us useful to start with a dynamics in which the novel character of the timedependent problem is more easily clarified as in the weakly nonlinear perturbation problem.…”
Section: The Nonlinear Problemmentioning
confidence: 99%
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“…Because the linear growth rates in this extended domain are small and the wave numbers are large, it is natural to wonder whether the effects of friction render these results of small importance in spite of their intrinsic interest. However, if the friction is primarily the result of a bottom Ekman layer type of interaction, the frictional effect relative to the inertial effects driving the instability actually diminishes as the wave number increases (Pedlosky 1987).…”
Section: Summary and Discussionmentioning
confidence: 99%