Asymptotic behavior for a Schr\"odinger equation with nonlinear subcritical dissipation
Abstract
We study the time-asymptotic behavior of solutions of the Schr\"odinger equation with nonlinear dissipation equation* ∂ t u = i u + λ |u|α u equation* in RN , N≥1, where λ∈ C, λ <0 and 0<α<2N. We give a precise description of the behavior of the solutions (including decay rates in L2 and L∞ , and asymptotic profile), for a class of arbitrarily large initial data, under the additional assumption that α is sufficiently close to 2N.
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