Blow-up of non-radial solutions for the L2 critical inhomogeneous NLS equation
Abstract
We consider the L2 critical inhomogeneous nonlinear Schr\"odinger (INLS) equation in RN i ∂t u + u +|x|-b |u|4-2bNu = 0, where N≥ 1 and 0<b<2. We prove that if u0∈ H1(RN) satisfies E[u0]<0, then the corresponding solution blows-up in finite time. This is in sharp contrast to the classical L2 critical NLS equation where this type of result is only known in the radial case for N≥ 2.
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