Level Set Dynamics and the Non-blowup of the 2D Quasi-geostrophic Equation
Abstract
In this article we apply the technique proposed in Deng-Hou-Yu (Comm. PDE, 2005) to study the level set dynamics of the 2D quasi-geostrophic equation. Under certain assumptions on the local geometric regularity of the level sets of θ, we obtain global regularity results with improved growth estimate on | ∇ θ |. We further perform numerical simulations to study the local geometric properties of the level sets near the region of maximum | ∇ θ |. The numerical results indicate that the assumptions on the local geometric regularity of the level sets of θ in our theorems are satisfied. Therefore these theorems provide a good explanation of the double exponential growth of | ∇ θ | observed in this and past numerical simulations.
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