Polynomial upper bounds for the instability of the Nonlinear Schr\"odinger equation below the energy norm
Abstract
We continue the study (initiated in ckstt:7) of the orbital stability of the ground state cylinder for focussing non-linear Schr\"odinger equations in the Hs(n) norm for 1- < s < 1, for small . In the L2-subcritical case we obtain a polynomial bound for the time required to move away from the ground state cylinder. If one is only in the H1-subcritical case then we cannot show this, but for defocussing equations we obtain global well-posedness and polynomial growth of Hs norms for s sufficiently close to 1.
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