Dynamic Transitions of Quasi-Geostrophic Channel Flow

Abstract

The main aim of this paper is to describe the dynamic transitions in flows described by the two-dimensional, barotropic vorticity equation in a periodic zonal channel. In CGSW03, the existence of a Hopf bifurcation in this model as the Reynolds number crosses a critical value was proven. In this paper, we extend the results in CGSW03 by addressing the stability problem of the bifurcated periodic solutions. Our main result is the explicit expression of a non-dimensional number γ which controls the transition behavior. We prove that depending on γ, the modeled flow exhibits either a continuous (Type I) or catastrophic (Type II) transition. Numerical evaluation of γ for a physically realistic region of parameter space suggest that a catastrophic transition is preferred in this flow.