On well-posedness results for the cubic-quintic NLS on T3
Abstract
We consider the periodic cubic-quintic nonlinear Schr\"odinger equation aligncqnlsabstract (i∂t + )u=μ1 |u|2 u+μ2 |u|4 uCQNLS align on the three-dimensional torus T3 with μ1,μ2∈ R \0\. As a first result, we establish the small data well-posedness of cqnlsabstract for arbitrarily given μ1 and μ2. By adapting the crucial perturbation arguments in zhang2006cauchy to the periodic setting, we also prove that cqnlsabstract is always globally well-posed in H1(T3) in the case μ2>0.
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