Global Well-Posedness and Blow-Up for the fifth order L2-critical KP-I equation
Abstract
In the current paper, we investigate the fifth order modified KP-I eqaution, namely equation* ∂t u-∂x5u-∂x-1∂yu+∂x(u3)=0. equation* This equation is L2 critical and we prove on R×R that it is globally well posed in the natural energy space if the L2 norm of the initial data is less the L2 norm of the ground state associated to this equation. We also find a subspace of the natural energy space associated to this equation where we have local well-posedness, nevertheless if the initial data is sufficiently localized we obtain blow-up. On R× T, we prove global well-posedness in the energy space for small data.
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