Local well-posedness and finite time blowup for fourth-order Schr\"odinger equation with complex coefficient
Abstract
We consider the fourth-order Schr\"odinger equation i∂tu+2 u+μ u+λ|u|α u=0, where α>0,μ=1 or 0 and λ∈C. Firstly, we prove local well-posedness in H4(N) in both H4 subcritical and critical case: α>0, (N-8)α≤8. Then, for any given compact set K⊂RN, we construct H4(N) solutions that are defined on (-T, 0) for some T>0, and blow up exactly on K at t=0.
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