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arxiv: 0806.4578 · v3 · submitted 2008-06-27 · 🧮 math.AP

Global attractor and asymptotic smoothing effects for the weakly damped cubic Schr\"odinger equation in L²(T)

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keywords attractorasymptoticcubicdampedglobalodingerschrsmoothing
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We prove that the weakly damped cubic Schr\"odinger flow in $L^2(\T)$ provides a dynamical system that possesses a global attractor. The proof relies on a sharp study of the behavior of the associated flow-map with respect to the weak $ L^2(\T) $-convergence inspired by a previous work of the author. Combining the compactness in $ L^2(\T) $ of the attractor with the approach developed by Goubet, we show that the attractor is actually a compact set of $ H^2(\T) $. This asymptotic smoothing effect is optimal in view of the regularity of the steady states.

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