Shota Kawakami, Shuji Machihara
Published 2019-05-30Version 1
We construct a finite time blow up solution for the nonlinear Schr\"odinger equation with the power nonlinearity whose coefficient is complex number. We generalize the range of both the power and the complex coefficient for the result of Cazenave, Martel and Zhao \cite{CMZ}. As a bonus, we may consider the space dimension $5$. We show a sequence of solutions closes to the blow up profile which is a blow up solution of ODE. We apply the Aubin-Lions lemma for the compactness argument for its convergence.
Existence and stability of solitons for the nonlinear Schrödinger equation on hyperbolic space
Continuous Dependence of Cauchy Problem For Nonlinear Schrödinger Equation in $H^{s}$
A determination of the blowup solutions to the focusing NLS with mass equal to the mass of the soliton
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