Uniformly attracting limit sets for the critically dissipative SQG equation
Abstract
We consider the global attractor of the critical SQG semigroup S(t) on the scale-invariant space H1(T2). It was shown in~CTV13 that this attractor is finite dimensional, and that it attracts uniformly bounded sets in H1+δ(T2) for any δ>0, leaving open the question of uniform attraction in H1(T2). In this paper we prove the uniform attraction in H1(T2), by combining ideas from DeGiorgi iteration and nonlinear maximum principles.
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