Minimal mass blow-up solutions for nonlinear Schr\"odinger equations with a singular potential

Abstract

We consider the following nonlinear Schr\"odinger equation with an inverse potential: \[ i∂ u∂ t+ u+|u|4Nu1|x|2σ|x|u=0 \] in RN. From the classical argument, the solution with subcritical mass (\|u\|2<\|Q\|2) is global and bounded in H1(RN). Here, Q is the ground state of the mass-critical problem. Therefore, we are interested in the existence and behaviour of blow-up solutions for the threshold (\|u0\|2=\|Q\|2).

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