On Turbulent Behavior of the Generalized Surface Quasigeostrophic Equations
Abstract
Turbulent behavior of the two-parameter family of generalized surface quasigeostrophic equations is examined both rigorously and numerically. We adapt a cascade mechanism argument to derive an energy spectrum that scales as 2β/3-3 where β controls the regularity of the velocity (β=1 in the special case of the SQG). Direct numerical simulations indicate that this fits better than β/3-3 which was derived in earlier work. Guided by earlier work on the 2D Navier-Stokes equations, we prove a certain condition implies a direct cascade of enstrophy, as well as an upper bound on the enstrophy dissipation rate, and sharp bounds on a dissipation wavenumber. The dependence of these rigorous results on the two parameters is demonstrated numerically.
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