Well-posedeness for the non-isotropic Schr\"odinger equations on cylinders and periodic domains
Abstract
The initial value problem (IVP) for the non-isotropic Schr\"odinger equation posed on the two-dimensional cylinders and T2 is considered. The IVP is shown to be locally well-posed for small initial data in Hs(T×R) if s≥0. For the IVP posed on R×T, given data are considered in the anisotropic Sobolev spaces thereby obtaining the local well-posedness result in Hs1, s2(R×T), if s1≥0 and s2>12. In the purely periodic case, a particular case of the IVP is shown to be locally well-posed for any given initial data in Hs(T2) if s>14. In some cases, ill-posedness issues are also considered showing that the IVP posed on T× R, in the focusing case, is ill-posed in the sense that the application data-solution fails to be uniformly continuous for data in Hs(T×R) if -12≤ s<0.
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