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Nonlinear effects in two-layer large-amplitude geostrophic dynamics. Part 1. The strong-beta case

Published online by Cambridge University Press:  10 June 2000

RICHARD H. KARSTEN
Affiliation:
Applied Mathematics Institute, Department of Mathematical Sciences, and Institute for Geophysical Research, University of Alberta, Edmonton, T6G 2G1, Canada
GORDON E. SWATERS
Affiliation:
Applied Mathematics Institute, Department of Mathematical Sciences, and Institute for Geophysical Research, University of Alberta, Edmonton, T6G 2G1, Canada

Abstract

Baroclinic large-amplitude geostrophic (LAG) models, which assume a leading-order geostrophic balance but allow for large-amplitude isopycnal deflections, provide a suitable framework to model the large-amplitude motions exhibited in frontal regions. The qualitative dynamical characterization of LAG models depends critically on the underlying length scale. If the length scale is sufficiently large, the effect of differential rotation, i.e. the β-effect, enters the dynamics at leading order. For smaller length scales, the β-effect, while non-negligible, does not enter the dynamics at leading order. These two dynamical limits are referred to as strong-β and weak-β models, respectively.

A comprehensive description of the nonlinear dynamics associated with the strong- β models is given. In addition to establishing two new nonlinear stability theorems, we extend previous linear stability analyses to account for the finite-amplitude development of perturbed fronts. We determine whether the linear solutions are subject to nonlinear secondary instabilities and, in particular, a new long-wave–short-wave (LWSW) resonance, which is a possible source of rapid unstable growth at long length scales, is identified. The theoretical analyses are tested against numerical simulations. The simulations confirm the importance of the LWSW resonance in the development of the flow. Simulations show that instabilities associated with vanishing potential- vorticity gradients can develop into stable meanders, eddies or breaking waves. By examining models with different layer depths, we reveal how the dynamics associated with strong-β models qualitatively changes as the strength of the dynamic coupling between the barotropic and baroclinic motions varies.

Type
Research Article
Copyright
© 2000 Cambridge University Press

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