Global existence versus finite time blowup dichotomy for the dispersion managed NLS
Abstract
We consider the Gabitov-Turitsyn equation or the dispersion managed nonlinear Schr\"odinger equation of a power-type nonlinearity \[ i∂t u+ dav ∂x2u+∫01 e-ir∂x2(|eir∂x2u|p-1eir∂x2u)dr=0 \] and prove the global existence versus finite time blowup dichotomy for the mass-supercritical cases, that is, p>9.
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