Unstable vortices, sharp non-uniqueness with forcing, and global smooth solutions for the SQG equation
Abstract
We prove non-uniqueness of weak solutions to the forced α-SQG equation with Sobolev regularity Ws,p in the supercritical regime s < α + 2p, covering the 2D Euler equation (α = 0), the Surface Quasi-Geostrophic equation (α = 1), and the intermediate cases. A key step is the construction of smooth, compactly supported vortices that exhibit non-linear instability. As a by-product, we show existence of global smooth solutions to the (unforced) α-SQG equation that are neither rotating nor traveling.
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