Profile decompositions and Blowup phenomena of mass critical fractional Schr\"odinger equations
Abstract
We study, under the radial symmetry assumption, the solutions to the fractional Schr\"odinger equations of critical nonlinearity in R1+d, d ≥ 2, with L\'evy index 2d/(2d-1) < < 2. We firstly prove the linear profile decomposition and then apply it to investigate the properties of the blowup solutions of the nonlinear equations with mass-critical Hartree type nonlineartity.
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